11 (3) ax² - (a+2) x + 2 = (-x+1) (-ax + 2) (-x+1) (-ax + 2) 13(3) 6x²-7xy+2y2+3x-y-3 1 -> -a - 2 -(α+2) a 2 -> a 2 (答) = 6x² + (-74+3)x + (24³-4-3) = = 2 6 x² + (-7y+3)x+(2y-3) (y+1) (-3x+2y-3) (-2x + y + 1) -3 2 X -3→ -3 2 2 -3 -1 (2y-3)→ -4y+6 -2 (3+1) -37-3 6 (23-3)(y+1) (-7y+3) (-3x+2y-3) (-2x+y+1) (答)

a αを定数とみる。 a = 1 × α を用いる。 (3) ax²-(a+2)x+2 1 -1- = (x-1)(ax-2) a -2 → -2 (a+2)

例題 11 (3) 6x2-7xy+2y2+3x-y-3 =6x²+(-7y+3)x+(2y2-y-3) = 2 (-7y+3)x (2x-3) x 6x²+(-7y+3)x+(2y-3)(y+1) = {3x-(2y-3)}{2x-(y+1)} =(3x-2y+3)(2x-y-1) 1 31 ↑↑ 3-3 2 1 3 -(2y-3)-4y+6 2 -(y+1)-3y-3 -7y+3 xにする °