Marque os itens seguintes que são verdadeiros:

Uma metalúrgica recebeu uma encomenda para fabricar, em grande quantidade, uma peça com o formato de um prisma reto com base triangular, cujas dimensões da base são 6 cm, 8 cm e 10 cm. Tal peça deve ser vazada de tal maneira que a perfuração na forma de um cilindro circular reto seja tangente às suas faces laterais, conforme mostra a figura.[br][br] [img]data:image/png;base64,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[/img][br]O raio da perfuração da peça é igual a [br]([b]dica[/b]: observe que 6, 8 e 10 é um terno pitagórico)

3 (Dolce & Pompeu-adaptado) Marque os itens seguintes que são verdadeiros.

4- A figura seguinte representa um triângulo ABC com uma circunferência inscrita. Sabendo que os lados AB, BC e AC medem, respectivamente, 7, 5 e 6, determine a medida do segmento EC. 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[/img][br]

5- Considere as seguintes afirmações:[br][list][*]As diagonais do paralelogramo se interceptam no ponto médio.[/*][/list][list][*]As três medianas de um triângulo interceptam-se num mesmo ponto que divide cada mediana em duas partes tais que a parte que contém o vértice é o dobro da outra. [/*][/list]A partir dessas informações e de seus conhecimentos resolva o seguinte problema: [br][br]Determine o valor de x, sabendo que o quadrilátero ABCD é um paralelogramo e M é o ponto médio de AB. [br][br] [img 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[/img]

6 (Dolce & Pompeu) - Sendo H o ortocentro de um triângulo ABC e B[math]\hat{H}[/math]C=150º, determine [math]\hat{A}[/math].

7 (Dolce & Pompeu) - Se P é o incentro de um triângulo ABC e B[math]\hat{P}[/math]C=125º, determine [math]\hat{A}[/math].

8 (Dolce & Pompeu) - O circuncentro de um triângulo isósceles é interno ao triângulo e duas mediatrizes formam um ângulo de 50º. Determine os ângulos desse triângulo.