25 a²(b +c) + b²(c+a) + C²(a+b) + 2a bo & ² ta. =²(b+c)dª² (1²+6)Q+ = (b + c) a² + (b²+c²t 2bc)Q+ (B³²c+bc²) = (b + c)a² + (b + c)²a + bc (b+c) = (b + c)fa² + (brc) a + bc} = (b+c)(Q+b) (a+c) = (a + b) (btc)(c + a) 次の式を展開せよ。 問題 1 (1) (x+3)3 =x2+9x² +270 +27 問題3 次の式を展開せよ。 (1) (x+3) (x²-3x+9) (x+3)(x²-3x+1+3²] = (x+3)(x² - x x3 + 3²) =x+33 = 2³+27 問題4 次の式を因数分解せよ (1) x3+1 = (x+1) (x²-x+1²) =(x+1) (x²-x+1) (2) (x-2)3 = x³-6x² + 12x - 8 (2) (4a-3b) (16 a² + 12ab +96²) 149-36714 = 49³ 36³ = 64a3-27b³ (2) 7³-1 =(x-1) (2²+2+(-13²] =(x-1) (x² + x + 1) (3) (3x-2g) 3 = 27x³ - 18x²y + 36 xy²-8y³ (4) 27a3-646³ = (3a - 4b) (3a²+ 12ab + (662) 問題5 x3+y3+3xy-1を因数分解せよ = (x+g-1) (x²+y² + xy - x - y - 1) (3) 89² +27 43 = (2x+3y) (4x² - 6xy +9y²)