tag:blogger.com,1999:blog-77502666180513150552024-03-06T00:09:48.881-08:00GENETICA ON LINEEste blog foi feito para apresentar conceitos de Genética. O responsável é Marcelo Aguiar Costa Lima, biólogo com Bacharelado (UFRJ), Mestrado (UFRJ) e Doutorado (UFRJ) em Ciências Biológicas, na modalidade Genética.
http://lattes.cnpq.br/7864985542636759
ESCLAREÇO QUE ESTE BLOG NÃO É PARA PRESTAÇÃO DE SERVIÇOS NEM SUBSTITUI A BIBLIOGRAFIA DOS CURSOS. SERVE PARA APOIO DE CONTEÚDO.Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.comBlogger525125tag:blogger.com,1999:blog-7750266618051315055.post-70047705354070982642019-12-06T06:04:00.002-08:002019-12-06T06:04:40.214-08:00NOTAS A3 NO SISTEMANOTAS A3 NO SISTEMA<br />
BOAS FÉRIASMarcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-70075215040930592002019-12-02T04:37:00.001-08:002019-12-06T06:05:07.454-08:00NOTAS A2 NO SISTEMAAtenção - Notas A2 no sistema!Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-53901167466780099632019-10-28T13:32:00.000-07:002019-10-28T13:32:50.820-07:00ATIVIDADE PARA A2APLICABILIDADE DO DNA EM ODONTOLOGIA
FORENSE.<br />
<br />
<a href="http://revodonto.bvsalud.org/pdf/occ/v14n4/a05v14n4.pdf">http://revodonto.bvsalud.org/pdf/occ/v14n4/a05v14n4.pdf</a><br />
<br />
ATIVIDADE:<br />
<br />
Elabore uma resenha deste artigoMarcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-33317859834767676692019-10-22T05:55:00.002-07:002019-10-22T05:55:24.083-07:00ATIVIDADE OBJETIVA PARA ESTUDO<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<b style="mso-bidi-font-weight: normal;"><span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">1) Como é a estrutura de
um nucleotídeo?</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(a) uma hexose, um açúcar e uma base nitrogenada</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(b) um grupamento fosfato, uma hexose e uma base
nitrogenada</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(c) um grupamento fosfato, um açúcar e uma base
nitrogenada</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(d) um açúcar, um grupamento fosfato e um aminoácido</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<b style="mso-bidi-font-weight: normal;"><span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">2) Em um genoma animal
foi determinado que o conteúdo de timina é de 28%. Assim:</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(a) o conteúdo de adenina é 72%</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(b) o conteúdo de adenina é 22%</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(c) o conteúdo de adenina é 28%</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(d) o conteúdo de adenina é 14%</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">3)
A enzima DNA polimerase é responsável por:</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(a) replicar o DNA e corrigir erros</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(b) transcrever o DNA e corrigir erros</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(c) replicar o DNA e inserir erros</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(d) transcrever o DNA e inserir erros</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">4)
Sobre a estrutura do DNA, podemos dizer que:</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(a) é uma molécula mononucleotídica
bifilamentar</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(b) é uma molécula mononucleotídica
unifilamentar</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(c) é uma molécula polinucleotídica
bifilamentar</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(d) é uma molécula polinucleotídica
unifilamentar</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">5)
Ao passo que as moléculas de RNA possuem uracila, as de DNA possuem:</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(a) timina</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(b) citosina</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(c) adenina</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: FR; mso-fareast-font-family: "Times New Roman";">(d) guanina</span><span lang="PT-BR" style="color: #333333; font-family: "Times New Roman","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">6)
As ligações entre os nucleotídeos são feitas por:</span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) ligações
fosfodiéster no mesmo filamento e pontes dissulfeto entre as fitas</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) ligações
fosfoenólicas no mesmo filamento e pontes de hidrogênio entre as fitas</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) ligações
fosfodiéster no mesmo filamento e pontes de hidrogênio entre as fitas</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) ligações
peptídicas no mesmo filamento e pontes dissulfeto entre as fitas</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">7)
No processo de duplicação do DNA:</span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) a molécula é
copiada a partir dos dois filamentos </span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) a molécula é
copiada a partir da transcrição</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) a molécula é
copiada a partir de cada um dos filamentos</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) a molécula é
fragmentada</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">8)
A melhor definição para genoma é:</span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) o material
genético nuclear de uma célula</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) o conjunto de
material genético dos seres vivos</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) o material
genético que uma célula usa</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) o conjunto do
material genético de um organismo</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">9)
Não faz parte do processo de replicação do DNA:</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) helicase</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) girase</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) RNA polimerase</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) ligase</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">10)
Marque a única afirmativa correta:</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) quanto maior um
genoma, mais complexo</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) o DNA é
quimicamente estável</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) as células podem
ter RNA como material genético</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) todos os genes de
uma célula são expressos ao mesmo tempo</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">11)
No processo de transcrição:</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) é formada uma
molécula de DNA</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) é formada uma
molécula de ribose</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) é formada uma
molécula de proteína</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) é formada uma
molécula de RNA</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">12)
O modelo proposto por Watson e Crick para a estrutura do DNA foi baseado em:</span></b><b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) evidências físicas
e biológicas</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) evidências
químicas e anatômicas</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) evidências
biológicas e químicas</span><span lang="PT-BR" style="color: #333333; font-family: "Georgia","serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman";"></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) evidências físicas
e químicas</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">13)A
função evolutiva do DNA é feita pela ocorrência de:</span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) deleções</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) translocações</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) mutações</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) replicações</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">14)O
processo de síntese de proteínas é denominado:</span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) tradução</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b)replicação</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) transcrição</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) sublimação</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
</div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">15)
A tradução é realizada pelos:</span></b></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(a) desmossomos</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(b) peroxissomos</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(c) cromossomos</span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "Arial","sans-serif"; font-size: 10.0pt; mso-ansi-language: PT-BR; mso-fareast-font-family: "Times New Roman";">(d) ribossomos</span></div>
Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-70458215730683288432019-10-22T05:53:00.004-07:002019-10-22T05:53:48.523-07:00LEITURAS COMPLEMENTARES POR ASSUNTO<br />
estrutura de ácidos nucleicos<br />
<a href="http://aprendendogenetica.blogspot.com.br/2011/03/genetica-molecular-ciencias-biologicas.html">http://aprendendogenetica.blogspot.com.br/2011/03/genetica-molecular-ciencias-biologicas.html</a><br />
<br />
replicação<br />
<a href="http://aprendendogenetica.blogspot.com.br/2011/03/genetica-molecular-ciencias-biologicas_21.html">http://aprendendogenetica.blogspot.com.br/2011/03/genetica-molecular-ciencias-biologicas_21.html</a><br />
<a href="https://www.dnalc.org/resources/3d/04-mechanism-of-replication-advanced.html">https://www.dnalc.org/resources/3d/04-mechanism-of-replication-advanced.html</a><br />
<br />
transcrição<br />
<a href="http://aprendendogenetica.blogspot.com.br/2011/03/genetica-molecular-aula-3-transcricao.html" target="_blank"> http://aprendendogenetica.blogspot.com.br/2011/03/genetica-molecular-aula-3-transcricao.html</a><br /> <br />
tradução <br />
<a href="http://aprendendogenetica.blogspot.com.br/2011/04/aula-5-bioologia-codigo-genetico-e.html">http://aprendendogenetica.blogspot.com.br/2011/04/aula-5-bioologia-codigo-genetico-e.html</a><br />
<a href="https://www.youtube.com/watch?v=ENuR__owqt8&feature=related">https://www.youtube.com/watch?v=ENuR__owqt8&feature=related</a><br />
<br />
mutação<br />
<a href="http://aprendendogenetica.blogspot.com.br/2010/05/genetica-molecular-mutacao-incompleta.html">http://aprendendogenetica.blogspot.com.br/2010/05/genetica-molecular-mutacao-incompleta.html</a><br />
<a href="http://aprendendogenetica.blogspot.com.br/2010/05/genetica-molecular-mutacao-ii.html">http://aprendendogenetica.blogspot.com.br/2010/05/genetica-molecular-mutacao-ii.html</a><br />
<br />
câncer<br />
<a href="http://aprendendogenetica.blogspot.com.br/2014/05/genetica-molecular-fundamentos-da.html">http://aprendendogenetica.blogspot.com.br/2014/05/genetica-molecular-fundamentos-da.html</a>Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-71364942512659411842019-10-22T05:52:00.001-07:002019-10-22T05:52:17.059-07:00MUTAÇÕEShttp://aprendendogenetica.blogspot.com/2019/05/mutacoes.htmlMarcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-86301468399988997672019-10-22T05:51:00.001-07:002019-10-22T05:51:49.298-07:00O CÓDIGO GENÉTICO E A SÍNTESE DE PROTEÍNAS http://aprendendogenetica.blogspot.com/2019/05/traducao-e-codigo-genetico.htmlMarcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-91769293495309900482019-10-22T05:50:00.001-07:002019-10-22T05:50:15.629-07:00TRANSCRIÇÃO E OS RNAShttp://aprendendogenetica.blogspot.com/2015/05/odontologia-transcricao-e-tipos-de-rna.htmlMarcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-71537817884252376732019-10-22T05:49:00.003-07:002019-10-22T05:49:51.059-07:00REPLICAÇÃOhttp://aprendendogenetica.blogspot.com/2015/05/odontologia-replicacao-do-dna.htmlMarcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-52059632501945214622019-10-22T05:49:00.001-07:002019-10-22T05:49:03.485-07:00ESTRUTURA DO DNAhttps://aprendendogenetica.blogspot.com/2018/10/odontologia-estrutura-do-dna.htmlMarcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-20576290820772283802019-10-22T05:47:00.001-07:002019-10-22T05:47:59.027-07:00MUDANÇA DE SALA DE AULAPassaremos a ter nossas aulas na sala C-314.Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-86388251163070323272019-10-11T04:21:00.001-07:002019-10-11T04:21:40.256-07:00MECANISMOS DE HERANÇA E HEREDOGRAMAS<span style="background-color: white; color: #666666; font-family: "Trebuchet MS", Trebuchet, Verdana, sans-serif; font-size: 13.2px;">- <a href="http://aprendendogenetica.blogspot.com.br/2012/05/genetica-odontologia-heredogramas.html" style="color: #888888; text-decoration-line: none;">http://aprendendogenetica.blogspot.com.br/2012/05/genetica-odontologia-heredogramas.html</a></span><br style="background-color: white; color: #666666; font-family: "Trebuchet MS", Trebuchet, Verdana, sans-serif; font-size: 13.2px;" /><span style="background-color: white; color: #666666; font-family: "Trebuchet MS", Trebuchet, Verdana, sans-serif; font-size: 13.2px;">- <a href="http://aprendendogenetica.blogspot.com.br/2016/05/odontologia-heredogramas-e-heranca.html" style="color: #888888; text-decoration-line: none;">http://aprendendogenetica.blogspot.com.br/2016/05/odontologia-heredogramas-e-heranca.html</a></span>Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-5982642933099668912019-09-16T14:36:00.001-07:002019-09-16T14:36:12.742-07:00ESTUDO ORIENTADO<div class="O0" style="direction: ltr; language: en-US; margin-bottom: 0pt; margin-left: .38in; margin-top: 4.32pt; mso-line-break-override: none; punctuation-wrap: hanging; text-align: justify; text-indent: -.38in; text-justify: inter-ideograph; unicode-bidi: embed; word-break: normal;">
<span style="font-family: inherit;"><b>1)O MATERIAL
GENÉTICO DE UMA CÉLULA HUMANA MEDE CERCA DE 1,8M. PARA CABER NA CÉLULA ELE DEVE
ESTAR COMPACTADO, MAS PARA SER USADO ELE DEVE ESTAR RELAXADO. COMO
ESTE PARADOXO É RESOLVIDO?</b></span></div>
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<span style="font-family: inherit;"><b><span style="font-style: italic;">Basicamente a célula mantém as porções de
DNA que não estão sendo utilizadas em um grau de enovelamento mais compacto, ao
passo que as regiões que estão sendo utilizadas permanecem em um estado de
compactação mais frouxo.</span>
</b></span></div>
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<span style="font-family: inherit;"><b> 2) O QUE
OCORRERIA EM
UMA CÉLULA
QUE NÃO FOSSE CAPAZ DE EXPRESSAR A CICLINA RESPONSÁVEL PELA FASE M?</b></span></div>
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<span style="font-family: inherit;"><b><i>Como
as ciclinas são responsáveis por ativar os cdks, não havendo expressão de
ciclina para a fase M a célula não seria capaz de fazer o checkpoint para
entrar em divisão. Seu destino, sem se dividir, seria invariavelmente a morte.</i>
</b></span></div>
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<span style="font-family: inherit;"><b>3)
EXPLIQUE COMO
OCORRE A DETERMINAÇÃO DO SEXO EM NOSSA ESPÉCIE.</b></span></div>
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<span style="font-family: inherit;"><i><b>Pertencemos
ao sistema XY de determinação de sexo gonadal. Neste sistema, os indivíduos do
sexo masculino são heterogaméticos (XY - formados por gametas com cromossomos
sexuais diferentes) enquanto que os indivíduos do sexo gonadal feminino são
homogaméticos (XX – formados por gametas contendo cromossomos sexuais iguais)
</b></i></span></div>
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<span style="font-family: inherit;"><b> 4)
COMO É
FEITA A CLASSIFICAÇÃO DOS CROMOSSOMOS?
</b></span></div>
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<span style="font-family: inherit;"><i><b>Existem
várias formas de classificação dos cromossomos. A classificação por bandeamento
permite a individualização de cada um dos nossos 24 tipos de cromossomos (22
autossomos + 2 sexuais). A classificação baseada na posição do centrômero
agrupa os cromossomos em metacentricos, sub-metacêntricos, acrocêntricos e
telocêntricos.
</b></i></span></div>
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<span style="font-family: inherit;"><b>5) O
QUE
SÃO ANEUPLOIDIAS? O QUE AS PROVOCA?</b></span></div>
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<span style="font-family: inherit;"><b><i>Aneuploidias
são anomalias cromossômicas nas quais não há envolvimento do conjunto
cromossômico n completo. Via de regra indivíduos
humanos aneuplóides possuem 45 ou 47 cromossomos (2n+/- 1). O mecanismo básico
de desencadeamento das aneuploidias é a não disjunção cromossômica. </i>
</b></span></div>
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<span style="font-family: inherit;"><b>6)
DIFERENCIE OS
PRINCIPAIS TIPOS DE ANOMALIA CROMOSSÔMICA ESTRUTURAL.</b></span></div>
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<span style="font-family: inherit;"><b><i>Nas
deleções temos perda de um segmento cromossômico (que pode ser terminal ou
intersticial). Na inversão, um segmento cromossômico se destaca e é reinserido
na orientação inversa. Na duplicação um segmento cromossômico é repetido em um
cromossomo, geralmente por crossing over desigual. Na translocação, um segmento
cromossômico é transferido para um outro cromossomo não homólogo.</i>
</b></span></div>
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<span style="font-family: inherit;"><b>7)
COMO PODEMOS
EXPLICAR O FATO DE ALGUNS TIPOS DE REARRANJOS CROMOSSÔMICOS ESTRUTURAIS
RESULTAREM NA OCORRÊNCIA DE SÍNDROMES TIPICAMENTE NUMÉRICAS?</b></span></div>
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<span style="font-family: inherit;"><i><b>Alguns
rearranjos estruturais podem gerar gametas desbalanceados, com porções
supranumerárias de segmentos cromossômicos. Assim, o zigoto formado apresenta,
além do par que usualmente apresentaria, mais este segmento extra. Dessa forma,
embora não tenha um cromossomo inteiro a mais ou a menos, o zigoto terá parte
de um cromossomo em cópia única ou triplicado.
</b></i></span></div>
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<span style="font-family: inherit;"><b>8) O
QUE É NÃO DISJUNÇÃO?</b></span></div>
<span style="font-family: inherit;"><b><i>É o
fenômeno de não separação dos cromossomos durante a divisão celular. Com sua
ocorrência, as células formadas herdam uma quantidade anormal de cromossomos,
gerando células filhas com cromossomos a mais e a menos</i>.</b></span>Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-13971165010215401532019-09-11T04:59:00.001-07:002019-09-11T04:59:30.339-07:00ANOMALIAS CROMOSSÔMICAS ESTRUTURAISANOMALIAS CROMOSSÔMICAS ESTRUTURAIS<br />
<br />
Além dos distúrbios envolvendo a alteração do número dos cromossomos,
temos também as anomalias que afetam a estrutura cromossômica como
decorrência de quebras cromossômicas seguidas ou não de realocação de
segmentos cromossômicos em regiões anormais.<br />
<br />
Basicamente podemos categorizar estas ocorrências em quatro grupos:<br />
1) <a href="http://www.virtual.epm.br/cursos/genetica/htm/figuras/dele.gif">deleções</a><br />
neste tipo de anomalia estrutural, uma parte do cromossomo é perdida,
resultando em monossomia para a região perdida. As deleções podem ser
intersticiais, quando envolvem 2 pontos de quebra, com perda de um
segmento interno e subsequente reunião da cromátide ou terminais, quando
envolvem apenas um ponto de quebra, com perda de toda a extremidade do
braço da cromátide.<br />
2) <a href="http://fotos.sapo.pt/qAUZkw63QFAuGynJcmuL/340x255">duplicações</a><br />
um segmento cromossômico é inserido em um homólogo, resultando na duplicação do segmento<br />
3) <a href="http://disciplinex.files.wordpress.com/2008/11/inversao1.jpg">inversões</a><br />
nesta tipo de ocorrência, um segmento cromossômico é destacado e, após
sofrer um giro de 180 graus, é reinserido (ficando com a orientação
inversa)<br />
4) <a href="http://genetica.ufcspa.edu.br/translocacao_reciproca.gif">translocação</a><br />
quando há troca de segmentos entre cromossomos não homólogos, chamamos
translocação recíproca. se a troca envolve um braço inteiro do
cromossomo, ela é dita <a href="http://www.portalsaofrancisco.com.br/alfa/sindrome-de-patau/imagens/sindrome-de-patau-8.jpg">Robertsoniana</a>.Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-90376349478297688362019-09-02T14:21:00.003-07:002019-09-11T04:58:20.819-07:00ANOMALIAS CROMOSSÔMICAS NUMERICAS<div style="background-color: white; color: #666666; font-size: 13.2px; text-align: justify;">
<span style="font-family: "arial" , "helvetica" , sans-serif;">ANOMALIAS CROMOSSÔMICAS NUMÉRICAS</span></div>
<div style="background-color: white; color: #666666; font-size: 13.2px; text-align: justify;">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br />Eventualmente um fenômeno de separação incorreta dos cromossomos ocorre durante a divisão de uma célula. Este erro de separação é chamado <i>não disjunção</i>. O fenômeno pode ocorrer tanto na mitose quanto na meiose.</span></div>
<div style="background-color: white; color: #666666; font-size: 13.2px; text-align: justify;">
<span style="font-family: "arial" , "helvetica" , sans-serif;">Quando ocorre na meiose, a não disjunção leva à formação de gametas com número incorreto de cromossomos. Entretanto, há diferença na proporção de gametas anômalos formados dependendo do erro ocorrer na primeira divisão (meiose I ou divisão reducional) ou na segunda divisão (meiose II ou divisão equacional). Quando há erro na primeira divisão, 100% dos gametas gerados tem conteúdo cromossômico anormal (50% com cromossomos a mais e 50% com cromossomos a menos). Já se o erro ocorre na segunda divisão, 50% dos gametas dserão normais, mas os 50% remanescentes terão número incorreto de cromossmomos (25% com cromossomos a mais e 25% com cromossomos a menos).</span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiXZbZsT5agyPvFZLc6RyzPRNIJOigZ5uSRLCIOwTYCFxWAMtmKd_j7yKWu0sDKds5FcbmArRa0fGR33zqdT7_J6Wy-a7C61kaKAkzgldcY9TQK5-COYh6QTHbJZ5cX2wiBSZjpEhEBLKk/s1600/NaoDisjuncao+meiose.gif" style="color: #888888; margin-left: 1em; margin-right: 1em; text-decoration-line: none;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img border="0" height="266" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiXZbZsT5agyPvFZLc6RyzPRNIJOigZ5uSRLCIOwTYCFxWAMtmKd_j7yKWu0sDKds5FcbmArRa0fGR33zqdT7_J6Wy-a7C61kaKAkzgldcY9TQK5-COYh6QTHbJZ5cX2wiBSZjpEhEBLKk/s320/NaoDisjuncao+meiose.gif" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; border: 1px solid rgb(238, 238, 238); box-shadow: rgba(0, 0, 0, 0.1) 1px 1px 5px; padding: 5px; position: relative;" width="320" /></span></a></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">A ocorrência de não disjunção mitótica leva a uma condição denominada mosaicismo cromossômico. Neste caso, como o erro ocorre em células somáticas, uma parte das células do organismo tem constituição cromossômica normal e outra parte fica com constituição cromossômica anormal. Assim, do ponto de vista genético, diferentes populações celulares coexistem no mesmo organismo.</span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgDvID3ZOqsfaVBzhbOVqmuJRMj7B6n32IGSbQVxjog-BQur6jsvbZwh_Hb8fXTFuila_Cz6lujrfWGFQhJmxLNs9n14F2Vw_MrFjCf8I_27EVfxUlkz-cBcJHkCZSO-LK2XvpKtco_Sfc/s1600/mosaicism-125937.gif" style="color: #888888; margin-left: 1em; margin-right: 1em; text-decoration-line: none;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img border="0" height="198" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgDvID3ZOqsfaVBzhbOVqmuJRMj7B6n32IGSbQVxjog-BQur6jsvbZwh_Hb8fXTFuila_Cz6lujrfWGFQhJmxLNs9n14F2Vw_MrFjCf8I_27EVfxUlkz-cBcJHkCZSO-LK2XvpKtco_Sfc/s320/mosaicism-125937.gif" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; border: 1px solid rgb(238, 238, 238); box-shadow: rgba(0, 0, 0, 0.1) 1px 1px 5px; padding: 5px; position: relative;" width="320" /></span></a></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<div style="background-color: white; color: #666666; font-size: 13.2px; text-align: justify;">
<span style="font-family: "arial" , "helvetica" , sans-serif;">A não disjunção é a causa principal das anormalidades que envolvem o número dos cromossomos. </span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">ANOMALIAS CROMOSSÔMICAS NUMÉRICAS</span></div>
<div style="background-color: white; color: #666666; font-size: 13.2px; text-align: justify;">
<span style="font-family: "arial" , "helvetica" , sans-serif;">As anomalias cromossômicas numéricas podem ser de dois tipos: as euploidias, nas quais há uma alteração envolvendo um conjunto cromossômico completo ou seu múltiplo (n, 2n, 3n, etc....) </span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">e as aneuploidias, nas quais o número de cromossomos envolvidos não alcança um conjunto cromossômico completo, ou seja, vai de 1 a (n-1) cromossomos, a mais ou a menos. O tipo mais comum de aneuploidia é a trissomia (presença de 3 cromossomos), mas podemos ter outras formas de variação, como a nulissomia, a monossomia e a tetrassomia</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">Em nossa espécie, a <a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh1qqR_GDB-mIB-pFIIJ4updYtfCLqJIU-D5IstF0lSsCKuSxOExJRB9wgLj2rFLep2t42MY4qvH3O4uH6j2kw64V9Ruiziu-INpJrggk_9gZ5ObrEc_GtI1l2aZ5Pm_m8LAUqT7wZfmuQ/s1600/p%25C3%25A7oidias.png" style="color: #888888; text-decoration-line: none;">euploidia</a> é incompatível com a sobrevida. Triploidia (3n) em natimortos e tetraploidia (4n) em <a href="https://www.google.com/imgres?imgurl=http://escuela.med.puc.cl/paginas/cursos/tercero/anatomiapatologica/imagenes_ap/fotos1103-1107/1103.jpg&imgrefurl=http://www.lookfordiagnosis.com/images.php?term%3DMola%2BHidatiforme%26lang%3D3%26from%3D8&usg=__SonJJ0jW27B9btWbl5D50KOT7NU%3D&h=640&w=438&sz=78&hl=pt-PT&start=0&zoom=1&tbnid=puAuUQO9aQfjCM:&tbnh=139&tbnw=109&ei=hmScTe3mLoPVgQe57IW_Bw&prev=/search?q%3Dmola%2Bhidatiforme%26hl%3Dpt-PT%26sa%3DX%26biw%3D1270%26bih%3D564%26tbm%3Disch%26prmd%3Divnsb&itbs=1&iact=hc&vpx=716&vpy=182&dur=2357&hovh=271&hovw=186&tx=82&ty=165&oei=hmScTe3mLoPVgQe57IW_Bw&page=1&ndsp=18&ved=1t:429,r:9,s:0" style="color: #888888; text-decoration-line: none;">molas</a> já foram descritas. Já as aneuploidias possuem configurações genéticas viáveis, permitindo que inferências sejam feitas em relação à presença de cromossomos supra (a mais) ou infra (a menos) numerários. Em termos gerais, poucas combinações genéticas com número de cromossomos alterado são viáveis, e, dentre estas, destacamos 3 anomalias que quenvolvem cromossomos autossômicos e 4 que envolvem cromossomos sexuais:</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><i>Autossômicas</i> -<i> ocorrem indistintamente em homens e mulheres</i><br />trissomia do 13, a síndrome de Patau<br />trissomia do 18, a síndrome de Edwards<br />trissomia do 21, a síndrome de Down (evite o termo "mongolismo")</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><i>Sexuais - ocorrem distintamente em homens e mulheres</i><br /><i>femininas</i><br />trissomia do X, a síndrome do triplo X (evite o termo "síndrome da superfêmea")<br />monossomia do X, a síndrome de Turner<br /><i>masculinas</i><br />dissomia do X, trissomia sexual, a síndrome de Klinefelter<br />dissomia do Y, trissomia sexual, a síndrome do duplo Y (evite o termo "síndrome do supermacho") </span></div>
Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-37952950803895073062019-09-02T14:20:00.000-07:002019-09-02T14:20:30.985-07:00ANIMAÇÕES PARA FIXAÇÃO<div class="separator" style="clear: both; text-align: left;">
ANIMAÇÃO MITOSE</div>
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ANIMAÇÃO COMPACTAÇÃO MATERIAL GENÉTICO</div>
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<br />Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-55748643787791658572019-09-02T14:14:00.001-07:002019-09-02T14:14:09.345-07:00CARIÓTIPO HUMANO<img height="342" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhN-Ki5PWn4xHITSEF3eCFWRlgvvAIfauX_iOG6GIzGjFguwhESue7G9fAl1h0Z388RX4zohMVasehja9PTlhtz0zU1csZg5unw0lzq2Kw4x3YfR3dIgC8-cRxMPUw1moDba7WDGefusU0/s400/Idiograma.JPG" width="400" />Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-22409167504867427552019-09-02T14:13:00.002-07:002019-09-02T14:13:27.899-07:00CROMOSSOMOS<span style="font-family: Arial, Helvetica, sans-serif;"><span style="background-color: white; color: #666666; font-size: 13.2px;">CROMOSSOMOS</span></span><br />
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<span style="font-family: Arial, Helvetica, sans-serif;"><br style="background-color: white; color: #666666; font-size: 13.2px;" /><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhcBGC2FfiW9OOl1-KB7br2tP4hdSV4IwD1QjQilOVjeduCaWA9R7EmKys2wrd4TWMvWZkWQYoy15b-1-vKUVB9JBdY7ghdyJztLuOQ6NdmJ4DLRCySOlF07aPeXAZq3-mP9nnMGT9mubo/s1600/cromo01.gif" style="color: #888888; margin-left: 1em; margin-right: 1em; text-decoration-line: none;"><img border="0" height="400" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhcBGC2FfiW9OOl1-KB7br2tP4hdSV4IwD1QjQilOVjeduCaWA9R7EmKys2wrd4TWMvWZkWQYoy15b-1-vKUVB9JBdY7ghdyJztLuOQ6NdmJ4DLRCySOlF07aPeXAZq3-mP9nnMGT9mubo/s400/cromo01.gif" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; border: 1px solid rgb(238, 238, 238); box-shadow: rgba(0, 0, 0, 0.1) 1px 1px 5px; padding: 5px; position: relative;" width="280" /></a><br />Os cromossomos são as unidades básicas da hereditariedade. O estudo destas estruturas celulares responsáveis pela transmissão das características é denominado <i>citogenética</i>. Estruturalmente, o cromossomo pode ser definido como uma unidade filamentosa de DNA altamente enovelada, que é observada durante o processo de divisão celular. Entretanto, o uso generalizado levou à associação do termo cromossomo ao material genético de uma célula.<br />O enovelamento característico dos cromossomos é decorrente da associação do filamento de DNA com proteínas, constituindo uma unidade estrutural denominada cromatina. A cromatina pode ser classificada em dois grupos gerais: i) a cromatina mais condensada, indisponível para transcrição dos genes, que é chamada <i>heterocromatina</i> e ii) a cromatina mais frouxamente enovelada, disponível para transcrição dos genes, denominada <i>eucromatina</i>. O empacotamento da cromatina é extremamente importante para a viabilidade da célula. Imagine que você fosse capaz de alinhar os 46 cromossomos que compõe o genoma nuclear humano. O filamento formado teria cerca de 1,8m! Isso mesmo, cerca de um metro e oitenta!<br /><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiPu1QPDRG-p_mRyIqV0iTA3alYYe_Az2pVf8Tnjb4jM7htuwwhuI-hH14IocUTPrLgpKiG9MNddRppIaDux4iub3EwVEcAVb0zypRNYjCTr3rE4APFcWF5zihr-P6oLQYKA5X_A1JsQ38/s1600/eu+hetero.jpg" style="color: #888888; margin-left: 1em; margin-right: 1em; text-decoration-line: none;"><img border="0" height="120" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiPu1QPDRG-p_mRyIqV0iTA3alYYe_Az2pVf8Tnjb4jM7htuwwhuI-hH14IocUTPrLgpKiG9MNddRppIaDux4iub3EwVEcAVb0zypRNYjCTr3rE4APFcWF5zihr-P6oLQYKA5X_A1JsQ38/s320/eu+hetero.jpg" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; border: 1px solid rgb(238, 238, 238); box-shadow: rgba(0, 0, 0, 0.1) 1px 1px 5px; padding: 5px; position: relative;" width="320" /></a><br />As proteínas que se associam ao DNA para compor a cromatina pertencem basicamente a dois grupos: i) as histonas, proteínas de caráter básico que são as responsáveis pelas etapas iniciais de condensação (enovelamento) do DNA e ii) as proteínas não-histonas, que pertencem a uma ampla variedade de famílias protéicas e são responsáveis pelas etapas posteriores de condensação e que culminam com o empacotamento máximo da cromatina, denominado cromossomo. O cromossomo é, então, o DNA na sua forma mais enovelada (e que se apresenta como uma molécula em forma de bastão com um comprimento cerca de 10.000 vezes menor que a molécula de DNA que o originou).<br />Diversas etapas, inicialmente envolvendo os 5 tipos de histonas (H1, H2a, H2b, H3 e H4) devem ser cumpridas para que o enovelamento possa ser concretizado. A associação com unidades de quatro tipos de histonas em pares (2 unidades de cada um dos tipos H2a, H2b, H3 e H4), denominada octâmero de histonas, é o primeiro passo, formando o<a href="http://upload.wikimedia.org/wikipedia/commons/8/87/Nucleosome.jpg" style="color: #888888; text-decoration-line: none;">nucleossoma</a>, uma estrutura que se assemelha a um <i><a href="http://www.fleury.com.br/Medicos/SaudeEmDia/Artigos/PublishingImages/croma.jpg" style="color: #888888; text-decoration-line: none;">colar de contas</a></i>. A presença da histona H1 nos intervalos do nucleossoma forma o solenóide, que, por sua vez, é enovelado sobre si mesmo gerando uma fibra cromossômica. O empacotamento sequencial das fibras gera o cromossomo propriamente dito.<br /><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhABZzKWJ-sCeJYXFucqkuNcJ30WwgUxwUf1dy4hVmkXdjGz9Y1kgRzLAEPcDQs_9XdBRG_Vwq5uTPZP9bEFWY8Gi_Xf1SODJdVSQjakMfL0LZWKtm6V86CyIXRnkbZ0gXrZqrGXeOKOHzA/s400/dna_cromossomas_estrutura_1.png" style="color: #888888; margin-left: 1em; margin-right: 1em; text-decoration-line: none;"><img border="0" height="367" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhABZzKWJ-sCeJYXFucqkuNcJ30WwgUxwUf1dy4hVmkXdjGz9Y1kgRzLAEPcDQs_9XdBRG_Vwq5uTPZP9bEFWY8Gi_Xf1SODJdVSQjakMfL0LZWKtm6V86CyIXRnkbZ0gXrZqrGXeOKOHzA/s400/dna_cromossomas_estrutura_1.png" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; border: 1px solid rgb(238, 238, 238); box-shadow: rgba(0, 0, 0, 0.1) 1px 1px 5px; padding: 5px; position: relative;" width="400" /></a><br />Podemos identificar uma série de elementos na organização estrutural de um cromossomo. Cada filamento constitui uma cromátide, que possui 2 extremidades denominadas telômeros. A cromátide é dividida por uma região mais condensada, denominada centrômero. O centrômero tem papel importante na separação dos cromossomos, pois é nesta região que se encontra o cinetocóro, complexo proteíco ao qual as proteínas do fuso de divisão se ligam.<br /><a href="http://webs.uvigo.es/mmegias/5-celulas/ampliaciones/imagenes/8-cromosoma-cinetocoro.png" style="color: #888888; margin-left: 1em; margin-right: 1em; text-decoration-line: none;"><img border="0" src="https://blogger.googleusercontent.com/img/proxy/AVvXsEgchSvTNBPkiIpR7QUBsqurdabyY6g6dFxtwvYO-bnM6wZ6MyYZiUxc89ptYc8g8WNLya0fPJO476wGRyJAvbMf-Df2v2OnxpKurxJXCqgqsYvF29HQZRFi4Vleh_ja57_DUWl_iXmKGB47_I0ENIFqde7Ca9XBjTgEVWtTN-AWii_9s1jWb_-ML1kxN6yZP4WsOrIYrvr7=s0-d" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; border: 1px solid rgb(238, 238, 238); box-shadow: rgba(0, 0, 0, 0.1) 1px 1px 5px; padding: 5px; position: relative;" /></a><br />O centrômero divide a cromátide em dois segmentos: o braço curto (referido como <i>p</i>) e o braço longo (referido como <i>q). </i>Dependendo da posição que o centrômero ocupa, podemos classificar os cromossomos em metacêntrico (centrômero na região central); sub-metacêntrico (centrômero deslocado para uma das extremidades, estabelecendo um braço que ocrresponde a cerca de 2/3 do cromossomo e outro correspondente a 1/3); acrocêntrico (centromero nitidamente deslocado para uma das extremidades) e telocêntrico (centrômero na região telomérica, fazendo com que o cromossomo apresente apenas 1 braço).<br />Em relação ao tamanho, originalmente os cromossomos foram divididos em 7 grupos (A a G), em ordem decrescente de tamanho:<br />- grupo A – cromossomos 1, 2 e 3<br />- grupo B – cromossomos 4 e 5<br />- grupo C – cromossomos 6 a 12 e X<br />- grupo D – cromossomos 13 a 15<br />- grupo E – cromossomos 16 a 18<br />- grupo F – cromossomos 19 e 20<br />- grupo G – cromossomos 21, 22 e Y<br />Com as técnicas de bandeamento, cada cromossomo pode ser identificado a partir de seu padrão de bandas. Estas técnicas consistem no tratamento de uma preparação de células rompidas que encontravam-se em processo de divisão, que são coradas e analisadas em microscópio. Com o bandeamento é possível identificar cada um dos cromossomos. A partir de então, os cromossomos autossômicos são numerados de 1 a 22 em ordem decrescente de tamanho. O par sexual é composto pelos cromossomos X e Y. Desta forma, a espécie humana apresenta 24 tipos de cromossomos diferentes: os 22 autosomos, e os sexuais X e Y (que apesar de comporem um par são diferentes entre si).</span></div>
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Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-7610637350820229132019-08-12T14:37:00.002-07:002019-08-12T14:37:48.704-07:00o ciclo celular<div class="MsoNormal" style="background-color: white; color: #666666; text-align: justify;">
<span style="font-family: inherit;">Durante sua vida, uma célula passa por diferentes etapas, caracterizadas por eventos celulares específicos e por alterações biológicas importantes. O fluxo entre estas etapas, ou transições, é finamente regulado e requer a ação de proteínas específicas, em geral proteínas quinases, que controlam a sucessão de etapas. Basicamente as etapas ocorrem de forma cíclica, representando o ciclo de vida da célula. </span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">O Ciclo celular consiste em uma série de eventos que alternam a divisão celular e a intérfase (etapa que ocorre entre as divisões). Dois importantes processos ocorrem no ciclo celular:</span></span></div>
<span style="font-family: inherit;"><span style="background-color: white; color: #666666;"><span style="line-height: 14.95px;">1) a duplicação do DNA, que corresponde à duplicação do material genético e </span></span><span style="background-color: white; color: #666666;"></span></span><br />
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">2) a divisão, que tanto envolve o material genético (cariocinese), quanto o conteúdo citoplasmático (citocinese).</span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">O ciclo celular é dividido em etapas: Intérfase e Mitose. A intérfase, que corresponde ao período entre as divisões é dividida em:</span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">Fase G1 (Gap1) = etapa de crescimento (aumento do volume citoplasmático) e preparação do DNA para replicação. É uma etapa de elevada taxa metabólica, com alta produção de proteínas e energia;</span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">Fase S (Síntese) = etapa de síntese do DNA, na qual o genoma é duplicado;</span></span></div>
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<span style="font-family: inherit;"><span style="line-height: 14.95px;">Fase G2 (Gap2) = etapa de preparação da célula para divisão. </span>Esta etapa é muito importante, pois como o DNA estará enovelado durante a divisão (fase M), não há possibilidade de síntese das moléculas necessárias ao processo. Assim, a <span style="line-height: 14.95px;">síntese de todas as moléculas que serão requeridas nos processos de citocinese e cariocinese </span>tem que ser produzido nesta etapa.</span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">A mitose, também chamada <i>Fase M</i>, corresponde à etapa de divisão propriamente dita, na qual ocorrem os processos de citocinese e cariocinese.</span></span></div>
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" 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<span style="font-family: inherit;">Algumas células altamente especializadas não cumprem a transição de comprometimento com a divisão celular, não ultrapassando o primeiro ponto de checagem durante a fase G1. </span></div>
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<span style="font-family: inherit;">Não ultrapassando este primeiro ponto, denominado ponto de restrição, a célula entra em repouso, em um fenômeno denominado quiescência. Esta etapa é também chamada de fase G0 ou fase quiescente<span style="line-height: 14.95px;">, se caracterizando pelo fato da célula manter sua atividade metabólica sem ter necessidade de duplicar o DNA para se dividir. </span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">Células quiescentes não realizam divisão celular. </span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">Em geral, as células que estão nesta etapa são altamente especializadas, não dispondo do elevado montante energético necessário para o cumprimento pleno do processo de divisão. Há uma correlação inversa entre o grau de especialização celular e o potencial de proliferação: <i>Quanto maior a especialização de uma célula, menor a sua capacidade de divisão</i>. Assim, células quiescentes NÃO se dividem!</span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">O controle do ciclo celular consiste na determinação da habilidade da célula de cumprir as diversas etapas do processo, sendo controlado por proteínas citoplasmáticas. Duas classes principais de proteínas participam deste processo: As ciclinas e os CDKs (<i>cyclin dependent kinases</i> – quinases dependentes de ciclina).</span></span></div>
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<span style="font-family: inherit;"><b><span style="line-height: 14.95px;">Ciclinas – proteínas cuja concentração varia (aumenta ou diminui) ao longo do ciclo de vida da célula.</span></b><span style="line-height: 14.95px;"></span></span></div>
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<span style="font-family: inherit;"><span style="line-height: 14.95px;">•<span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><span style="line-height: 14.95px;">Ciclinas de G1 (D ciclinas)</span></span></div>
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<span style="font-family: inherit;"><span style="line-height: 14.95px;">•<span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><span style="line-height: 14.95px;">Ciclinas da fase-S (ciclinas E e A)</span></span></div>
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<span style="font-family: inherit;"><span style="line-height: 14.95px;">•<span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><span style="line-height: 14.95px;">Cilcinas mitóticas (B ciclinas)</span></span></div>
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<span style="font-family: inherit;"><b><span style="line-height: 14.95px;">Quinases dependentes de ciclina (CDKs) – proteínas cuja concentração é constante ao longo do ciclo de vida da célula.</span></b><span style="line-height: 14.95px;"></span></span></div>
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<span style="font-family: inherit;"><span style="line-height: 14.95px;">•<span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><span style="line-height: 14.95px;">CDK de G1 (CDK4)</span></span></div>
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<span style="font-family: inherit;"><span style="line-height: 14.95px;">•<span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><span style="line-height: 14.95px;">CDK da fase-S (CDK2)</span></span></div>
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<span style="font-family: inherit;"><span style="line-height: 14.95px;">•<span style="font-stretch: normal; font-variant-east-asian: normal; font-variant-numeric: normal; line-height: normal;"> </span></span><span style="line-height: 14.95px;">CDK da fase-M (CDK1)</span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">Ao serem ativadas pelas ciclinas, os CDKs adicionam grupamentos fosfato (que possuem carga) a uma variedade de proteínas (que são seus substratos de catálise) para controlar os diferentes processos envolvidos no ciclo celular –<b> </b>estes processos envolvem a ativação ou inativação de proteínas-alvo, que determinarão o curso do ciclo da célula em questão.</span></span></div>
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" style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial; border: 1px solid rgb(238, 238, 238); box-shadow: rgba(0, 0, 0, 0.1) 1px 1px 5px; padding: 5px;" width="400" /><br /><span style="line-height: 14.95px;"></span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">Representando graficamente o comportamento de ciclinas e CDKs ao longo do ciclo celular (concentração x tempo), observaríamos a oscilação das ciclinas (em azul) e a constancia dos CDKs (em vermelho).</span></span></div>
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<span style="line-height: 14.95px;"><span style="font-family: inherit;">O aumento da concentração do Fator de promoção da fase S (SPF), que inclui ciclinas do tipo A ligadas à CDK2, leva entra no núcleo e prepara a célula para replicar seu DNA (e seus centrômeros). Conforme o DNA é replicado, E ciclinas são degradadas, e os níveis de ciclinas mitóticas começa a aumentar (em G2). O Fator de promoção da fase M (o complexo das ciclinas mitóticas do tipo B com CDK da fase M (CDK1) inicia uma serie de processos, incluindo a montagem dos fusos mitóticos, a vesiculação do envelope nuclear, a interrupção de todos os processos de transcrição genética e a condensação dos cromossomos</span></span></div>
Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-57426445456263046122019-08-02T04:11:00.002-07:002019-08-02T04:11:21.893-07:00PLANO DE ENSINO<br />
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<a href="https://www.blogger.com/null" name="_GoBack"></a><b style="mso-bidi-font-weight: normal;"><span style="font-family: "Calibri","sans-serif"; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri; mso-fareast-language: EN-US; mso-no-proof: yes;"><!--[if gte vml 1]><v:shapetype id="_x0000_t75" coordsize="21600,21600"
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">PLANO
DE ENSINO <o:p></o:p></span></b></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">CURSO<span style="mso-tab-count: 1;"> </span></span></b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">ODONTOLOGIA
<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">DISCIPLINA<span style="mso-tab-count: 1;"> </span></span></b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">GENÉTICA<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">CÓDIGO<span style="mso-tab-count: 1;"> </span></span></b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">ODO8054<span style="mso-tab-count: 1;"> </span><b>CARGA
HORÁRIA<span style="mso-tab-count: 1;"> </span></b>66h<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">EMENTA<span style="mso-tab-count: 1;"> </span></span></b><i><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;"><o:p></o:p></span></i></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Fundamentos
de Genética Humana. Cromossomos humanos e ciclo celular. Conceitos básicos de
genética molecular: DNA, RNA, funções, mutações. Padrões de transmissão de
caracteres monogênicos autossômicos e ligados ao sexo. Doenças hereditárias que
afetam o complexo oro-facio-cranial. Interações genético-ambientais.
Diferenciação sexual normal e anômala. Aconselhamento genético.<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">OBJETIVO
DA DISCIPLINA<span style="mso-tab-count: 1;"> </span></span></b><i><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;"><o:p></o:p></span></i></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Ao final
desta Disciplina, espera-se que o aluno tenha aprendido a:<o:p></o:p></span></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Desenvolver
os conhecimentos básicos de Genética, enfatizando a Genética Humana, onde o
aluno deverá compreender as funções fundamentais do material genético desde a
sua estrutura física e química, expressão e regulação, mutação e recombinação,
até os conhecimentos básicos das aplicações da Genética em Odontologia.<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">UNIDADE
1 </span></b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Bases Cromossômicas da hereditariedade e
anomalias cromossômicas <i><o:p></o:p></i></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">OBJETIVOS
DA UNIDADE 1<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<i><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Ao
final desta Unidade, espera-se que o aluno tenha aprendido a:<o:p></o:p></span></i></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Identificar
os elementos genéticos responsáveis pela transmissão e manutenção da informação
genética<b><o:p></o:p></b></span></div>
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<br /></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
1.1 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">PROCESSOS
DE DIVISÃO CELULAR <o:p></o:p></span></div>
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<br /></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
1.2 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">CROMOSSOMOS
I – ESTRUTURA E NOMENCLATURA.<o:p></o:p></span></div>
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<br /></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
1.3<o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">CROMOSSOMOS
II – ANOMALIAS CROMOSSÔMICAS<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">UNIDADE
2 </span></b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Mecanismos de Herança<b><o:p></o:p></b></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">OBJETIVOS
DA UNIDADE 2<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<i><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Ao
final desta Unidade, espera-se que o aluno tenha aprendido a:<o:p></o:p></span></i></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Identificar
os principais mecanismos associados à transmissão dos caracteres<b><o:p></o:p></b></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
2.1 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">MECANISMOS
DE HERANÇA I – GENÉTICA MENDELIANA <o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
2.2 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">MECANISMOS
DE HERANÇA II – EXTENSÃO AO TRABALHO DE MENDEL<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
2.3 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">ANÁLISE
E ELABORAÇÃO DE HEREDOGRAMAS.<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">UNIDADE
3 </span></b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Bases moleculares da hereditariedade<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">OBJETIVOS
DA UNIDADE 3<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<i><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Ao
final desta Unidade, espera-se que o aluno tenha aprendido a:<o:p></o:p></span></i></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Caracterizar
os processos relacionados à utilização do material genético e ao surgimento da
variação, com sua importância no desencadeamento de patologias de etiologia
genética <o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
3.1 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">ESTRUTURA
DE ÁCIDOS NUCLEICOS.<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
3.2 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">UTILIZAÇÃO
DA INFORMAÇÃO GENÉTICA <i><o:p></o:p></i></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
3.3 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">EXPRESSÃO
GÊNICA.<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">AULA
3.4 – Conteúdo:<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">MUTAÇÃO
E VARIABILIDADE GENÉTICA.<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">METODOLOGIA<span style="mso-tab-count: 1;"> </span><o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">As aulas
teóricas serão de caráter expositivo, com projeção de imagens e outros recursos
“multimídia”, ou desenvolvidas a partir da discussão de situações-problema
relacionadas à Genética. Leitura dirigida e debates de artigos científicos na
área; apresentação oral com debate de pesquisas. Serão realizadas atividades
práticas recomendadas, estudos dirigidos além de sugestão de vídeos sobre o
assunto para debate em sala de aula<i><o:p></o:p></i></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">PROCEDIMENTOS
DE AVALIAÇÃO<o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">As
avaliações aplicadas incluirão provas contendo questões objetivas e discursivas.
<o:p></o:p></span></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Serão
utilizados estudos dirigidos e atividades orientadas para reforço dos conteúdos
ministrados e os alunos desenvolverão, ao longo do semestre letivo, atividades
extraclasse (descritas ao final deste documento) que contabilizarão 1,0 (hum e
zero) ponto em cada avaliação (A1 e A2). <o:p></o:p></span></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">A
pontuação integral (10,0 – dez e zero) da avaliação A3 será relacionada ás
questões objetivas e discursivas da prova, não havendo atividade extraclasse.<o:p></o:p></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">BIBLIOGRAFIA
BÁSICA<o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">-
JORDE, C., BAMSHAD e WHITE. Genética Médica. Ed Elsevier. 3a. Ed. 2006.<o:p></o:p></span></div>
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<span style="font-family: "Calibri","sans-serif"; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri;">- KLUG, W. S.; PALLADINO, M. A. ; SPENCER C. A.;
Cummings MR. </span><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Conceitos de Genética. ed. ARTMED, 2a. Ed., Rio
de Janeiro, 2010.<o:p></o:p></span></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">-
ROBINSON, W. M. e BORGES-OSÓRIO, M. R. Genética para Odontologia. ArtMed. 1ª.
Ed. 2006.<span style="mso-tab-count: 1;"> </span><i><o:p></o:p></i></span></div>
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<b><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">BIBLIOGRAFIA
COMPLEMENTAR<o:p></o:p></span></b></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">WATSON et al. Biologia Molecular do gene. ARTMED, 5º edição.2006.<o:p></o:p></span></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">PIERCE, B. Genética um enfoque conceitual. 5a ed. Rio de Janeiro,
2002.<o:p></o:p></span></div>
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<span style="font-family: "Calibri","sans-serif"; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri;">LEWIN, B. Genes IX. ARTMED, 9a. Ed, 2009.<o:p></o:p></span></div>
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<span style="font-family: "Calibri","sans-serif"; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri;">GRIFFITHS, A. J. F.; MILLER, J. R.; SUZUKI, D.
T.; LEWONTIN, R. C.; GELBART, W. M. Introdução à Genética. Ed. Gen, 9a. Ed,
2008.<o:p></o:p></span></div>
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<span style="font-family: "Calibri","sans-serif"; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri;">NUSSBAUM, R. I.; MCINNES, R. R.; WILLARD, H.
F. Thompson & Thompson:<span style="mso-spacerun: yes;"> </span>Genética
Médica. </span><span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Ed. Elsevier, 7ª. Edição, Rio de Janeiro, 2008..<o:p></o:p></span></div>
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<span lang="PT-BR" style="font-family: "Calibri","sans-serif"; mso-bidi-font-family: Calibri;">Site
www.aprendendogenetica.blogspot.com, sob responsabilidade do docente que
ministra a disciplina<o:p></o:p></span></div>
<br />Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-79810891081957528552019-08-02T04:10:00.000-07:002019-11-01T04:39:37.477-07:00BOAS VINDAS 2019/2<span style="font-family: "arial" , "helvetica" , sans-serif;">Olá alunos do curso de Odontologia,</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span><span style="font-family: "arial" , "helvetica" , sans-serif;">Sejam bem vindos para mais um semestre da Disciplina <i>Genética</i></span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span><span style="font-family: "arial" , "helvetica" , sans-serif;">Utilizaremos este blog como ferramenta para comunicação dos avanços no desenvolvimento da disciplina.</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span><span style="font-family: "arial" , "helvetica" , sans-serif;">Um excelente semestre letivo para todos!</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span><span style="font-family: "arial" , "helvetica" , sans-serif;">CRONOGRAMA PROPOSITIVO </span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;">02.08 - apresentação do curso e avaliações. genética e saúde</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;">09.08 - ciclo celular</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;">16.08 - divisão celular</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;">23.08 - cromossomos I - estrutura e organização</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;">30.08 - cromossomos II - anomalias numéricas</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;">06.09 - cromossomos III - anomalias estruturais</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;">13.09 - atividade orientada</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;">20.09 - A1</span><br />
<span style="font-family: arial, helvetica, sans-serif;">27.09 - vista e revisão de prova. a genética molecular</span><br />
<span style="font-family: arial, helvetica, sans-serif;">04.10 - mecanismos moleculares da hereditariedade</span><br />
<span style="font-family: arial, helvetica, sans-serif;">11.10 - os ácidos nucleicos</span><br />
<span style="font-family: arial, helvetica, sans-serif;">18.10 - funções do DNA</span><br />
<span style="font-family: arial, helvetica, sans-serif;">25.10 - uso da informação genética</span><br />
<span style="font-family: arial, helvetica, sans-serif;">01.11 - bases moleculares da variabilidade</span><br />
<span style="font-family: arial, helvetica, sans-serif;">08.11 - polimorfismos genéticos</span><br />
<span style="font-family: arial, helvetica, sans-serif;">15.11 - feriado</span><br />
<span style="font-family: arial, helvetica, sans-serif;">22.11 atividade orientada</span><br />
<span style="font-family: arial, helvetica, sans-serif;">29.11- A2</span><br />
<span style="font-family: arial, helvetica, sans-serif;">06.12 - A3</span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span>
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<span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">Fundamentos de Genética Humana. Cromossomos humanos e ciclo celular. Conceitos básicos de genética molecular: DNA, RNA, funções, mutações. Padrões de transmissão de caracteres monogênicos autossômicos e ligados ao sexo. Doenças hereditárias que afetam o complexo oro-facio-cranial. Interações genético-ambientais. Diferenciação sexual normal e anômala. Aconselhamento genético.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><b><span lang="PT-BR" style="font-family: "calibri" , "sans-serif"; mso-bidi-font-family: Calibri;">OBJETIVO DA DISCIPLINA<span style="mso-tab-count: 1;"> </span></span></b><i><span lang="PT-BR" style="font-family: "calibri" , "sans-serif"; mso-bidi-font-family: Calibri;"></span></i></span></div>
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<span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">Ao final desta Disciplina, espera-se que o aluno tenha aprendido a:</span></div>
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<span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">Desenvolver os conhecimentos básicos de Genética, enfatizando a Genética Humana, onde o aluno deverá compreender as funções fundamentais do material genético desde a sua estrutura física e química, expressão e regulação, mutação e recombinação, até os conhecimentos básicos das aplicações da Genética em Odontologia.</span><br />
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<b><span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">BIBLIOGRAFIA BÁSICA</span></b></div>
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<span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">- JORDE, C., BAMSHAD e WHITE. Genética Médica. Ed Elsevier. 3a. Ed. 2006.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-family: "calibri" , "sans-serif"; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri;">- KLUG, W. S.; PALLADINO, M. A. ; SPENCER C. A.; Cummings MR. </span><span lang="PT-BR" style="font-family: "calibri" , "sans-serif"; mso-bidi-font-family: Calibri;">Conceitos de Genética. ed. ARTMED, 2a. Ed., Rio de Janeiro, 2010.</span></span></div>
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<span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">- ROBINSON, W. M. e BORGES-OSÓRIO, M. R. Genética para Odontologia. ArtMed. 1ª. Ed. 2006.<span style="mso-tab-count: 1;"> </span></span></div>
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<b><span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">BIBLIOGRAFIA COMPLEMENTAR</span></b></div>
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<span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">WATSON et al. Biologia Molecular do gene. ARTMED, 5º edição.2006.</span></div>
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<span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">PIERCE, B. Genética um enfoque conceitual. 5a ed. Rio de Janeiro, 2002.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri;">LEWIN, B. Genes IX. ARTMED, 9a. Ed, 2009.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri;">GRIFFITHS, A. J. F.; MILLER, J. R.; SUZUKI, D. T.; LEWONTIN, R. C.; GELBART, W. M. Introdução à Genética. Ed. Gen, 9a. Ed, 2008.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-family: "calibri" , "sans-serif"; mso-ansi-language: EN-US; mso-bidi-font-family: Calibri;">NUSSBAUM, R. I.; MCINNES, R. R.; WILLARD, H. F. Thompson & Thompson:<span style="mso-spacerun: yes;"> </span>Genética Médica. </span><span lang="PT-BR" style="font-family: "calibri" , "sans-serif"; mso-bidi-font-family: Calibri;">Ed. Elsevier, 7ª. Edição, Rio de Janeiro, 2008..</span></span></div>
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<span lang="PT-BR" style="font-family: "arial" , "helvetica" , sans-serif; mso-bidi-font-family: Calibri;">Site www.aprendendogenetica.blogspot.com, sob responsabilidade do docente que ministra a disciplina</span></div>
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Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-50525707440283845172019-07-01T06:07:00.001-07:002019-07-01T06:07:03.577-07:00ATENÇÃO ODONTOLOGIAPrezados alunos,<br />
<br />
As notas foram lançadas no sistema. Boas férias!<br />
Informo que as avaliações não ficam com o docente, são entregues à instituição para arquivamento. As vias para solicitação de vista e/ou revisão de prova constam do manual do aluno.<br />
<br />
AttMarcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-63077081370633568782019-06-17T17:13:00.000-07:002019-06-17T17:14:19.656-07:00DNA - MOLÉCULAS<div class="separator" style="clear: both; text-align: center;">
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<br />Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-23645009846798869322019-06-04T08:08:00.001-07:002019-06-04T08:08:13.831-07:00resposta ao anônimoPrezado anônimo,<br />
<br />
reproduzo sua mensagem e faço os esclarecimentos que entendo serem necessários<br />
<i><br /></i>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
<i>"prof,
nao entendo porque nas aulas o senhor diz que todo o conteudo está no
blog, sendo que quando eu tento estudar por aqui, não encontro nem
metade do que o senhor diz nas aulas... como você espera que estudemos
assim???"</i></div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
Em momento nenhum foi dito que TODO O CONTEÚDO da aula está no blog. Conforme dito na apresentação da disciplina, o blog possui um RESUMO DAS AULAS, NÃO SENDO SUBSTITUTO DA BIBLIOGRAFIA DO CURSO. </div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
Em nenhum momento a proposta do blog foi ou será de substituir as aulas. Deve servir como um complemento. Isso é explicado na apresentação da disciplina e está presente na própria apresentação da página (...<span><u>SERVE PARA APOIO DE CONTEÚDO MINISTRADO EM SALA DE AULA</u>)</span></div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
Feito o primeiro esclarecimento, vamos para o segundo</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
Como espero que vocês estudem? Espero que estudem normalmente, como para qualquer outra disciplina, buscando as informações nas anotações feitas durante a aula e nos livros indicados na bibliografia do curso, tendo o blog como um material suplementar.</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
Atenciosamente</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
</div>
<div __gwt_cell="cell-gwt-uid-1973" style="outline-style: none;" tabindex="0">
Marcelo. </div>
Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0tag:blogger.com,1999:blog-7750266618051315055.post-5252403181648068052019-05-24T04:27:00.002-07:002019-06-04T07:55:26.807-07:00ATIVIDADE ORIENTADA 2<br />
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">1) Como é a estrutura de um
nucleotídeo?</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) uma hexose, um açúcar e uma base nitrogenada</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) um grupamento fosfato, uma hexose e uma base
nitrogenada</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: red;"><span lang="FR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) um grupamento fosfato, um açúcar e uma base
nitrogenada</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) um açúcar, um grupamento fosfato e um aminoácido</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">2) Em um genoma animal foi
determinado que o conteúdo de timina é de 28%. Assim:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) o conteúdo de adenina é 72%</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) o conteúdo de adenina é 22%</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span style="color: red;"><span lang="FR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) o conteúdo de adenina é 28%</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) o conteúdo de adenina é 14%<o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">3) A enzima DNA
polimerase é responsável por:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="FR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) replicar o DNA e corrigir erros</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) transcrever o DNA e corrigir erros</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) replicar o DNA e inserir erros</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) transcrever o DNA e inserir erros<o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">4) Sobre a
estrutura do DNA, podemos dizer que:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) é uma molécula mononucleotídica bifilamentar</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) é uma molécula mononucleotídica
unifilamentar</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="FR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) é uma molécula polinucleotídica
bifilamentar</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) é uma molécula polinucleotídica
unifilamentar<o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">5) Ao passo que
as moléculas de RNA possuem uracila, as de DNA possuem:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="FR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) timina</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) citosina</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) adenina</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="FR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) guanina<o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">6) As ligações entre
os nucleotídeos são feitas por:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) ligações fosfodiéster no mesmo filamento e
pontes dissulfeto entre as fitas</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) ligações fosfoenólicas no mesmo filamento
e pontes de hidrogênio entre as fitas</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) ligações fosfodiéster no mesmo filamento e
pontes de hidrogênio entre as fitas</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) ligações peptídicas no mesmo filamento e
pontes dissulfeto entre as fitas</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">7) No processo de
duplicação do DNA:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) a molécula é copiada a partir dos dois
filamentos</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) a molécula é copiada a partir da
transcrição</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) a molécula é copiada a partir de cada um
dos filamentos</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) a molécula é fragmentada</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br />
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">8) A melhor
definição para genoma é:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) o material genético nuclear de uma célula</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) o conjunto de material genético dos seres
vivos</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) o material genético que uma célula usa</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) o conjunto do material genético de um
organismo</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">9) Não faz parte do
processo de replicação do DNA:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) helicase</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) girase</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) RNA polimerase</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) ligase<o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">10) Marque a única
afirmativa correta:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) quanto maior um genoma, mais complexo</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) o DNA é quimicamente estável</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) as células podem ter RNA como material
genético</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) todos os genes de uma célula são expressos
ao mesmo tempo</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">11) No processo de
transcrição:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) é formada uma molécula de DNA</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) é formada uma molécula de ribose</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) é formada uma molécula de proteína</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) é formada uma molécula de RNA</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
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<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">12) O modelo
proposto por Watson e Crick para a estrutura do DNA foi baseado em:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
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<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) evidências físicas e biológicas</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
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<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) evidências químicas e anatômicas</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) evidências biológicas e químicas</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) evidências físicas e químicas</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
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<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">13) A função
evolutiva do DNA é feita pela ocorrência de:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) deleções</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) translocações</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) mutações</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) replicações</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<br /></div>
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<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">14) O processo de
síntese de proteínas é denominado:<o:p></o:p></span></div>
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<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) tradução</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) replicação</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) transcrição</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) sublimação</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
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<br />
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">15) A tradução é
realizada pelos:</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(a) desmossomos</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
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<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(b) peroxissomos</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: 15.45pt; margin-bottom: .0001pt; margin-bottom: 0in; text-align: justify;">
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(c) cromossomos</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
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<span style="color: red;"><span lang="PT-BR" style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">(d) ribossomos</span></span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
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<br /></div>
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<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">QUESTÕES DISCURSIVAS
</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
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<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;">1) Como é feita a
decodificação da informação genética?</span><br />
<span lang="PT-BR" style="color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt;"><span style="color: red;">explicar como funciona o sistema de decodificação utilizando o código genético</span> </span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt;"><o:p></o:p></span></div>
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<br /></div>
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<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">2) Quais são as funções
do DNA. Que processos sao utilizados para que estas funcoes sejam <b>cumpridas? </b></span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><span style="background-color: red;"><span><b></b><span style="background-color: white;"><b><span style="color: red;">relacionar os processos biológicos re<span style="font-family: "trebuchet ms" , "sans-serif";">sponsáveis pelas funções genotípica, fenotípica e evolutiva</span></span></b></span></span></span><br />
</span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br />
</span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">
</span><span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">3) Como ocorre a duplicação do DNA?</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><b><span style="color: red;">explicar como ocorre o processo, indicando o papel das enz<span style="font-family: "trebuchet ms" , "sans-serif";">imas envolvidas</span></span></b><br />
<br />
</span><span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">4) Como são classificadas as
mutações? </span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><b><span style="color: red;">indicar uma das formas de classificação - pela natureza, pelo mecanismo desencadeador, pelas consequencias, etc....</span></b><br />
</span><span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br />
5) Como agem as radiações sobre o DNA?</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><b><span style="color: red;">explicar o que a exposição a agentes físi<span style="font-family: "trebuchet ms" , "sans-serif";">co<span style="font-family: "trebuchet ms" , "sans-serif";">s provoca <span style="font-family: "trebuchet ms" , "sans-serif";">no DNA</span></span></span></span></b><br />
</span><span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br />
6) Quais sao e que função possuem os principais tipos de RNA</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><span style="color: red;"><b>identificar cada um dos principais tipos de RNA, indicando seu papel biológico</b></span><br />
</span><span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br />
7) Como está estruturado um gene?</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span style="color: red;"><b><span lang="PT-BR" style="font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">indicar os elementos que estão necessariamente presentes em um gene</span></b></span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"> </span><span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br />
8) O que é o código genético?</span><span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span lang="PT-BR" style="color: #666666; font-family: "trebuchet ms" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><b><span style="color: red;">apresentar o sistema de decodificação da informação genética</span></b><br />
</span><span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br />
9) Diferencie a DNA polimerase da RNA polimerase em termos de atividade
funcional.</span><br />
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><o:p></o:p></span></div>
<div class="MsoNormal">
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><span style="color: red;">indicar as atividades exercidas por estas enzimas n<span style="font-family: "arial" , "sans-serif";">os processos em que estão relacionadas</span></span></span><br />
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br /></span></div>
<div class="MsoNormal">
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">10) O que diferencia
os padrões de herança?<o:p></o:p></span></div>
<div class="MsoNormal">
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><span style="color: red;">apresentar as diferenças básicas entre autossômico X ligado a<span style="font-family: "arial" , "sans-serif";">o sexo e dominante x recessivo. indicar a presença de um padrão específico para a herança de organelas</span></span></span><br />
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"></span><br />
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br /></span></div>
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<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">11) o que é um heredograma?</span><br />
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><span style="color: red;"><span style="font-family: "arial" , "sans-serif";">apresentar o sistema de representação de relações familiares</span></span> </span><br />
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><br /></span>
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">12) Há uma equivalência entre o comprimento do mRNA e da proteína?</span><br />
<span style="color: red;"><span lang="PT-BR" style="background: white; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;">indicar a relação entre a mensagem que está contida no RNA e a sequência de ami<span style="font-family: "arial" , "sans-serif";">noácidos da proteína</span></span></span><br />
<span lang="PT-BR" style="background: white; color: #333333; font-family: "arial" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"><span style="font-family: "arial" , "sans-serif";"> </span> </span></div>
Marcelo Aguiar Costa Limahttp://www.blogger.com/profile/15995758813608655968noreply@blogger.com0