[br][br][b]1.[/b] (OMEC) O vértice [b]A[/b] de um triângulo está na origem do sistema de coordenadas, o vértice [b]B[/b] está no ponto (2, 2) e [b]C[/b] no ponto (2, – 2). Assim, a equação da reta que passa por [b]A[/b] e pelo ponto médio de [b]BC[/b] é:[br][br]a) y = 0                          b) x = 0                         c) x + y = 0            d) y = 2              e) x = 2[br][br][b][br]2.[/b] (FAAP) A equação da reta que passa pelo ponto (3, – 2), com inclinação de 60°, é:[br][br][br]a) [math]\sqrt{3}x-y-2-3\sqrt{3}=0[/math] b) [math]\sqrt{3}x-3y-6-3\sqrt{3}=0[/math] c) [math]\sqrt{3}x+y+3-2\sqrt{3}=0[/math] d) [math]\sqrt{3}x-y-2+2\sqrt{3}=0[/math][br] [br][br][b]3.[/b] (UFMG) Observe o gráfico das retas [b][u]r [/u][/b]e [b][u]s[/u][/b], de equações [b]3x + 2y = 4[/b] e [b]x + my = 3[/b], respectivamente. 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[/img][/center][br] A inclinação da reta [b][u]s[/u][/b] é:[br][br]a) -1/4                        b) 1/2                       c) 1                    d) 2               e) 4[br][br][br][b]4.[/b] (UEL) Se M[sub]1[/sub] e M[sub]2[/sub] são pontos médios dos segmentos AB e AC onde A(–1,6), B(3,6) e C(1,0), logo o coeficiente angular da reta contem M[sub]1[/sub] e M[sub]2[/sub] é:[br][br]a) – 1                                b) 3                          c) 2                          d)[math]\frac{-\sqrt{3}}{2}[/math] e) 3/[br][br][br][b]5.[/b] (UCMG) A equação da reta que passa pelo ponto (1,1) e forma um triângulo isósceles com os eixos coordenados é:[br][br][br]a) x + y – 2 = 0               b) x + 2y = 0     c) 2x – y – 1 = 0             d) 2x – 2y – 3 = 0       e) 2x + 2y – 1 = 0[br][br][br][b]6.[/b] (UFPA) A reta [b]y = mx – 5[/b] é paralela à reta [b]2y = – 3x + 1[/b]. Então o valor de [b][u]m[/u][/b] é:[br][br][br]a) – 3             b) -1\3 c) 3\2 d) -3\2 e) 1\2[br] [br][br][b]7.[/b] (UFP) A equação da reta paralela à reta determinada pelos pontos (2, 3) e (1, – 4), passando pela origem, é:[br][br]a) y = x                              b) 7y = x                                 c) y = 3x –4                        d) y = 7x           [br][br][br][b]8.[/b] (PUC) Para que [b]2x – y + 4 = 0 [/b]e [b]ax – 2y = – c [/b]sejam equações da mesma reta, os valores de [b][u]a[/u][/b] e [b][u]c[/u][/b] devem ser, respectivamente, iguais a:[br][br][br]a) – 4 e – 8                    b) – 2 e – 4             c) 1 e 2                      d) 2 e 4                 e) 4 e 8 [br][br][br][b]9.[/b] (UFC) Seja P = (a, 1) um ponto da reta [b][u]r[/u][/b] de equação [b]4x – 2y – 2 = 0[/b]. A equação da reta [b][u]s[/u][/b] que passa por [b]P [/b]e é perpendicular a [b][u]r[/u][/b] é:[br][br]a) x + 2y – 3 = 0   b) x – 2y + 1 = 0    c) 2x – y = 0    d) 2x+ y – 3 = 0     e) 2x + y + 3 = 0[br][br][br][b]10.[/b] (UnB) As retas [b]4x + 6y – 5 = 0 [/b]e [b]14x + 30y + 2 = 0[/b] interceptam-se em um ponto [b]M[/b]. A reta que passa por [b]M[/b] e é perpendicular à reta de equação [b]12x +1= 5y[/b] é:[br][br]a) 5x + 12y – 2 = 0        b) 5x = 12y + 8 = 0      c) 10x + 24y = 0            d) 10x + 24y + 7 = 0[br][br][br][b]11.[/b] (PUC) A reta [b][u]r[/u][/b] é determinada pelos pontos (8,0) e (0,–6). A reta [b][u]s [/u][/b]que passa pela origem e é perpendicular a [b][u]r [/u][/b]tem equação:[br][br]a) 4x + 3y = 0      b) 3x + 4y = 0      c) 4x – 3y = 0    d) 3x – 4y = 0         e) 4x - 4y = 0[br][br][b][br]12.[/b] (VUNESP) A equação da mediatriz do segmento (Mediatriz é uma reta perpendicular a um segmento de reta e que passa pelo ponto médio deste segmento.)  cujas extremidades são os pontos A = (3, 2) e[br]B = (– 2, – 4) é: [br][br]a) 10x + 12y + 7 =0        b) 10x + 5y + 7 = 0       c) 5x + 10y + 7 = 0           d)12x + 10y + 7 = 0[br][br][b][br]13. (UFRGS) [/b]A distância do ponto (2, m) à reta [b]x – y = 0[/b] é [math]\sqrt{8}[/math]. O valor de [b][u]m [/u][/b]é:[br][br]a) – 12 ou 6          b) –6                           c) 2                   d) – 2 ou 6                   e) 2 ou – 6[br][br][br][b]14. (UFSC) [/b]Dados os pontos A = (1, -1), B = (-1, 3) e C = (2, 7), determine a medida da altura do triângulo ABC relativa ao lado BC.[br][br][br][br][b][center]GABARITO[/center][/b][br][br][b]1) [/b]a; [b]2)[/b] a; [b]3)[/b] a; [b]4)[/b] b; [b]5)[/b] a; [b]6)[/b] d; [b]7)[/b] d; [b]8)[/b] e; [b]9)[/b] a; [b]10)[/b] d; [b]11)[/b] a; [b]12)[/b] a; [b]13)[/b] d; [b]14)[/b] 4 u.c.;[br]