[b]Notas:[/b] [br][list][*]Começa por construir os objetos geométricos (reta e ponto). [/*][*]Lembra-te que a distância é a medida do menor segmento cujos extremos são um ponto da reta e o ponto exterior à reta e que isso acontece se esse segmento de reta for perpendicular à reta. [/*][*]Podes então continuar a construção para obteres a distância pretendida.  [/*][/list]

[b]Notas:[/b] [br][list][*]Começa por colocar dois pontos A e B na folha geométrica, os quais definem um segmento de reta (são os extremos desse segmento de reta). [/*][*]Constrói depois o ponto médio do segmento de reta, o qual, por definição, dista igualmente de A e de B (diz-se [u]equidistante [/u]de A e de B). [/*][*]Coloca outro ponto no plano e determina as distâncias a A e a B. [/*][*]Move depois o ponto para um local em que estas medidas se igualem. [/*][*]Onde deves colocar um terceiro ponto que seja equidistante de A e de B? [/*][*]Qual é o conjunto de todos os pontos que estão à mesma distância de A e de B? Desenha-o![/*][/list]

[b]Notas:[/b] [br][list][*]Começa por construir duas semirretas com a mesma origem de modo a definirem um ângulo convexo e um ângulo côncavo (as semirretas são lados dos ângulos). [/*][*]Mede depois cada um dos ângulos.[/*][/list]

[b]Notas:[/b] [br][list][*]Utiliza o ângulo convexo construído aquando da resolução da questão anterior e coloca um ponto no seu interior. [/*][*]Determina a distância a cada uma das semirretas (recorda o que fizeste para dar resposta à questão 1) e depois move-o para um local onde essas distâncias sejam iguais. [/*][*]Onde deves colocar outro ponto de modo a que ele seja também equidistante das semirretas[/*][*]Qual é o conjunto de todos os pontos que estão à mesma distância dos lados do ângulo?[/*][/list]

[size=150]A [b]circunferência dos nove pontos[/b] é uma circunferência definida a partir de um triângulo, que passa por nove pontos notáveis desse triângulo, nomeadamente:[br][list][*]Os pés das alturas do triângulo (H_A, H_B e H_C);[/*][*]Os pontos médios dos lados do triângulo (M_{AB}, M_{BC} e M_{AC});[/*][*]Os pontos médios dos segmentos de reta cujos extremos são o ortocentro e cada um dos vértices do triângulo (A, B e C) (M_{AO}, M_{BO}, M_{CO}).[/*][/list][/size]

Notas: Para construir um triângulo retângulo, considera: [br][list][*]um segmento de reta [ AB ] ; [/*][*]uma reta perpendicular a AB que passe por A e sobre ela marca um ponto C ; [/*][*]Constrói o triângulo [ ABC ] . [/*][/list]

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[/img]