初二 分解因式
(1)(x²-1)(x+3)(x+5)+12=(2)x²+5xy+x+3y+6y²=(3)(2a+5)(a²-9)(2a-7)-1...
(1)(x²-1)(x+3)(x+5)+12=
(2)x²+5xy+x+3y+6y²=
(3)(2a+5)(a²-9)(2a-7)-19
(4)(x+y)^4(x²-y²)²+(x-y)^4
(5)(x^4-4x²+1)(x^4+3x²+1)+10x^4
抱歉第3题的题目打错了,应该是(2a+5)(a²-9)(2a-7)-91 展开
(2)x²+5xy+x+3y+6y²=
(3)(2a+5)(a²-9)(2a-7)-19
(4)(x+y)^4(x²-y²)²+(x-y)^4
(5)(x^4-4x²+1)(x^4+3x²+1)+10x^4
抱歉第3题的题目打错了,应该是(2a+5)(a²-9)(2a-7)-91 展开
1个回答
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解,
1,原式=(x+1)(x-1)(x+3)(x+5)+12
=(x+1)(x+3)(x-1)(x+5)+12
=(x2+4x+3)(x2+4x-5)+12
令
x2+4x=t
原式=(t+3)(t-5)+12=t2-2t-15+12=t2-2t-3=(t-3)(t+1)=(x2+4x-3)(x2+4x+1)
2,原式=x²+5xy+6y²+x+3y=(x+2y)(x+3y)+x+3y=(x+2y+1)(x+3y)
3, 原式=(2a+5)(a²-9)(2a-7)-19=(2a+5)(a-3)(a+3)(2a-7)-19=(2a2-a-15)(2a2-a-21)-19 令
2a2-a-15=t 则原式=t(t-6)-91=(t-13)(t+7)=自己算
4,原式=(x+y)^4(x-y)²(x+y)²+(x-y)^4=[(x+y)^6-(x-y)^2](x-y)^2
5,这道题对于初中生来说太难了,不要求 解,令x2=t,原式=(t2-4t+1)(t2+3t+1)+10t2=t4-t3-t+1,设,t4-t3-t+1=0,发现t=1是方程的根,运用多项式除法,得(t4-t3-t+1)/(t-1)=t3-1,所以t4-t3-t+1=(t-1)(t3-1)=(t-1)^2(t2+t+1)
则原式=(x2-1)^2(x4+x2+1)=(x+1)^2(x-1)^2(x4+x2+1),以后有问题来问我哈
1,原式=(x+1)(x-1)(x+3)(x+5)+12
=(x+1)(x+3)(x-1)(x+5)+12
=(x2+4x+3)(x2+4x-5)+12
令
x2+4x=t
原式=(t+3)(t-5)+12=t2-2t-15+12=t2-2t-3=(t-3)(t+1)=(x2+4x-3)(x2+4x+1)
2,原式=x²+5xy+6y²+x+3y=(x+2y)(x+3y)+x+3y=(x+2y+1)(x+3y)
3, 原式=(2a+5)(a²-9)(2a-7)-19=(2a+5)(a-3)(a+3)(2a-7)-19=(2a2-a-15)(2a2-a-21)-19 令
2a2-a-15=t 则原式=t(t-6)-91=(t-13)(t+7)=自己算
4,原式=(x+y)^4(x-y)²(x+y)²+(x-y)^4=[(x+y)^6-(x-y)^2](x-y)^2
5,这道题对于初中生来说太难了,不要求 解,令x2=t,原式=(t2-4t+1)(t2+3t+1)+10t2=t4-t3-t+1,设,t4-t3-t+1=0,发现t=1是方程的根,运用多项式除法,得(t4-t3-t+1)/(t-1)=t3-1,所以t4-t3-t+1=(t-1)(t3-1)=(t-1)^2(t2+t+1)
则原式=(x2-1)^2(x4+x2+1)=(x+1)^2(x-1)^2(x4+x2+1),以后有问题来问我哈
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