初二数学因式分解复习题 初二数学因式分解题100道
\u521d\u4e8c\u6570\u5b66\u56e0\u5f0f\u5206\u89e3\u7ec3\u4e60\u989850\u9053(1)-6ax3y+8x2y2-2x2y
(2)3a2(x-y)3-4b2(y-x)2
(3)(x+y)(m-a)-3y(a-m)2+(a-m)3
(4)8x(a-1)-4(1-a)
(5)m(1-a)+mn(1-a)+1-a
(1)16x4-64y4
(2)16x6-1/4
(3)(a6+b4)2-4a6b4
(5)-2m8+512
(6)(x+y)3-64 \u6216m3-64n3
(1)-6ax^3y+8x^2y^2-2x^2y
=2x^2y(-3ax+4y-1)
(2)3a^2(x-y)^3-4b^2(y-x)^2
=(x-y)^2(3a^2-4b^2)
=(x-y)^2(3^0.5a+2b)(3^0.5a-2b)
(3)(x+y)(m-a)-3y(a-m)^2+(a-m)^3
=(a-m)[(a-m)^2-3y(a-m)-(x-y)]
\u6b64\u9898\u662f\u4e0d\u662f\u6709\u9519,\u6309\u7167\u9053\u7406\u540e\u9762\u8fd9\u4e00\u9879\u8fd8\u53ef\u4ee5\u518d\u5206\u89e3\u7684,\u662f\u5173\u4e8e(a-m)\u7684\u5206\u89e3\u5f0f
(4)8x(a-1)-4(1-a)
=4(a-1)(2x+1)
(5)m(1-a)+mn(1-a)+1-a
=(1-a)(m+mn+1)
\u6b64\u9898\u662f\u4e0d\u662f\u6709\u9519,\u6309\u7167\u9053\u7406\u540e\u9762\u8fd9\u4e00\u9879\u8fd8\u53ef\u4ee5\u518d\u5206\u89e3\u7684
\u4f8b\u5982:m+n+mn+1=(m+1)(n+1)
(1)16x4-64y4
=16(x^4-4y^4)
=16(x^2+2y^2)(x-2^0.5y)(x+2^0.5y)
(2)16x6-1/4
=1/4(64x^6-1)
=1/4(8x^3-1)(8x^3+1)
=1/4(2x-1)(4x^2+2x+1)(2x+1)(4x^2-2x+1)
(3)(a6+b4)2-4a6b4
=a^12+2a^6b^4+b^8-4a^6b^4
=a^12-2a^6b^4+b^8
=(a^6-b^4)^2
=(a^3+b^2)^2(a^3-b^2)^2
(5)-2m8+512
=-2(m^8-256)
=-2(m^4-16)(m^4+16)
=-2(m^2-4)(m^2+4)(m^4+16)
=-2(m-2)(m+2)(m^2+4)(m^4+16)
(6) (x+y)3-64
=(x+y-4)(x^2+2xy+y^2+4x+4y+16)
\u6216m3-64n3
=(m-4n)(m^2+4mn+16n^2)
1- 14 x2
4x \u20132 x2 \u2013 2
( x- y )3 \u2013(y- x)
x2 \u2013y2 \u2013 x + y
x2 \u2013y2 \uff0d1 ( x + y) (x \u2013 y )
x2 + 1 x2 \uff0d2\uff0d\uff08 x \uff0d1x )2
a3\uff0da2\uff0d2a
4m2\uff0d9n2\uff0d4m+1
3a2+bc\uff0d3ac-ab
9\uff0dx2+2xy\uff0dy2
2x2\uff0d3x\uff0d1
\uff0d2x2+5xy+2y2
10a(x\uff0dy)2\uff0d5b(y\uff0dx)
an+1\uff0d4an\uff0b4an-1
x3(2x\uff0dy)\uff0d2x\uff0by
x(6x\uff0d1)\uff0d1
2ax\uff0d10ay\uff0b5by\uff0b6x
1\uff0da2\uff0dab\uff0d14 b2
a4\uff0b4
(x2\uff0bx)(x2\uff0bx\uff0d3)\uff0b2
x5y\uff0d9xy5
\uff0d4x2\uff0b3xy\uff0b2y2
4a\uff0da5
2x2\uff0d4x\uff0b1
4y2\uff0b4y\uff0d5
3X2\uff0d7X+2
8xy(x\uff0dy)\uff0d2(y\uff0dx)3
x6\uff0dy6
x3\uff0b2xy\uff0dx\uff0dxy2
(x\uff0by)(x\uff0by\uff0d1)\uff0d12
4ab\uff0d\uff081\uff0da2\uff09\uff081\uff0db2\uff09
\uff0d3m2\uff0d2m\uff0b4
a2\uff0da\uff0d6
2(y\uff0dz)\uff0b81(z\uff0dy)
9m2\uff0d6m\uff0b2n\uff0dn2
ab(c2\uff0bd2)\uff0bcd(a2\uff0bb2)
a4\uff0d3a2\uff0d4
x4\uff0b4y4
a2\uff0b2ab\uff0bb2\uff0d2a\uff0d2b\uff0b1
x2\uff0d2x\uff0d4
4x2\uff0b8x\uff0d1
2x2\uff0b4xy\uff0by2
- m2 \u2013 n2 + 2mn + 1
(a + b)3d \u2013 4(a + b)2cd+4(a + b)c2d
(x + a)2 \u2013 (x \u2013 a)2
\u2013x5y \u2013 xy +2x3y
x6 \u2013 x4 \u2013 x2 + 1
(x +3) (x +2) +x2 \u2013 9
(x \u2013y)3 +9(x \u2013 y) \u20136(x \u2013 y)2
(a2 + b2 \u20131 )2 \u2013 4a2b2
(ax + by)2 + (bx \u2013 ay)2
x2 + 2ax \u2013 3a2
3a3b2c\uff0d6a2b2c2\uff0b9ab2c3
xy\uff0b6\uff0d2x\uff0d3y
x2(x\uff0dy)\uff0by2(y\uff0dx)
2x2\uff0d(a\uff0d2b)x\uff0dab
a4\uff0d9a2b2
ab(x2\uff0dy2)\uff0bxy(a2\uff0db2)
(x\uff0by)(a\uff0db\uff0dc)\uff0b(x\uff0dy)(b\uff0bc\uff0da)
a2\uff0da\uff0db2\uff0db
(3a\uff0db)2\uff0d4(3a\uff0db)(a\uff0b3b)\uff0b4(a\uff0b3b)2
(a\uff0b3)2\uff0d6(a\uff0b3)
(x\uff0b1)2(x\uff0b2)\uff0d(x\uff0b1)(x\uff0b2)2
35.\u56e0\u5f0f\u5206\u89e3x2\uff0d25\uff1d \u3002
36.\u56e0\u5f0f\u5206\u89e3x2\uff0d20x\uff0b100\uff1d \u3002
37.\u56e0\u5f0f\u5206\u89e3x2\uff0b4x\uff0b3\uff1d \u3002
38.\u56e0\u5f0f\u5206\u89e34x2\uff0d12x\uff0b5\uff1d \u3002
39.\u56e0\u5f0f\u5206\u89e3\u4e0b\u5217\u5404\u5f0f\uff1a
(1)3ax2\uff0d6ax\uff1d \u3002
(2)x(x\uff0b2)\uff0dx\uff1d \u3002
(3)x2\uff0d4x\uff0dax\uff0b4a\uff1d \u3002
(4)25x2\uff0d49\uff1d \u3002
(5)36x2\uff0d60x\uff0b25\uff1d \u3002
(6)4x2\uff0b12x\uff0b9\uff1d \u3002
(7)x2\uff0d9x\uff0b18\uff1d \u3002
(8)2x2\uff0d5x\uff0d3\uff1d \u3002
(9)12x2\uff0d50x\uff0b8\uff1d \u3002
40.\u56e0\u5f0f\u5206\u89e3(x\uff0b2)(x\uff0d3)\uff0b(x\uff0b2)(x\uff0b4)\uff1d \u3002
41.\u56e0\u5f0f\u5206\u89e32ax2\uff0d3x\uff0b2ax\uff0d3\uff1d \u3002
42.\u56e0\u5f0f\u5206\u89e39x2\uff0d66x\uff0b121\uff1d \u3002
43.\u56e0\u5f0f\u5206\u89e38\uff0d2x2\uff1d \u3002
44.\u56e0\u5f0f\u5206\u89e3x2\uff0dx\uff0b14 \uff1d \u3002
45.\u56e0\u5f0f\u5206\u89e39x2\uff0d30x\uff0b25\uff1d \u3002
46.\u56e0\u5f0f\u5206\u89e3\uff0d20x2\uff0b9x\uff0b20\uff1d \u3002
47.\u56e0\u5f0f\u5206\u89e312x2\uff0d29x\uff0b15\uff1d \u3002
48.\u56e0\u5f0f\u5206\u89e336x2\uff0b39x\uff0b9\uff1d \u3002
49.\u56e0\u5f0f\u5206\u89e321x2\uff0d31x\uff0d22\uff1d \u3002
50.\u56e0\u5f0f\u5206\u89e39x4\uff0d35x2\uff0d4\uff1d \u3002
51.\u56e0\u5f0f\u5206\u89e3(2x\uff0b1)(x\uff0b1)\uff0b(2x\uff0b1)(x\uff0d3)\uff1d \u3002
52.\u56e0\u5f0f\u5206\u89e32ax2\uff0d3x\uff0b2ax\uff0d3\uff1d \u3002
53.\u56e0\u5f0f\u5206\u89e3x(y\uff0b2)\uff0dx\uff0dy\uff0d1\uff1d \u3002
54.\u56e0\u5f0f\u5206\u89e3(x2\uff0d3x)\uff0b(x\uff0d3)2\uff1d \u3002
55.\u56e0\u5f0f\u5206\u89e39x2\uff0d66x\uff0b121\uff1d \u3002
56.\u56e0\u5f0f\u5206\u89e38\uff0d2x2\uff1d \u3002
57.\u56e0\u5f0f\u5206\u89e3x4\uff0d1\uff1d \u3002
58.\u56e0\u5f0f\u5206\u89e3x2\uff0b4x\uff0dxy\uff0d2y\uff0b4\uff1d \u3002
59.\u56e0\u5f0f\u5206\u89e34x2\uff0d12x\uff0b5\uff1d \u3002
60.\u56e0\u5f0f\u5206\u89e321x2\uff0d31x\uff0d22\uff1d \u3002
61.\u56e0\u5f0f\u5206\u89e34x2\uff0b4xy\uff0by2\uff0d4x\uff0d2y\uff0d3\uff1d \u3002
62.\u56e0\u5f0f\u5206\u89e39x5\uff0d35x3\uff0d4x\uff1d \u3002
63.\u56e0\u5f0f\u5206\u89e3\u4e0b\u5217\u5404\u5f0f\uff1a
(1)3x2\uff0d6x\uff1d \u3002
(2)49x2\uff0d25\uff1d \u3002
(3)6x2\uff0d13x\uff0b5\uff1d \u3002
(4)x2\uff0b2\uff0d3x\uff1d \u3002
(5)12x2\uff0d23x\uff0d24\uff1d \u3002
(6)(x\uff0b6)(x\uff0d6)\uff0d(x\uff0d6)\uff1d \u3002
(7)3(x\uff0b2)(x\uff0d5)\uff0d(x\uff0b2)(x\uff0d3)\uff1d \u3002
(8)9x2\uff0b42x\uff0b49\uff1d \u3002
(1)(x\uff0b2)\uff0d2(x\uff0b2)2\uff1d \u3002
(2)36x2\uff0b39x\uff0b9\uff1d \u3002
(3)2x2\uff0bax\uff0d6x\uff0d3a\uff1d \u3002
(4)22x2\uff0d31x\uff0d21\uff1d \u3002
70.\u56e0\u5f0f\u5206\u89e33ax2\uff0d6ax\uff1d \u3002
71.\u56e0\u5f0f\u5206\u89e3(x\uff0b1)x\uff0d5x\uff1d \u3002
72.\u56e0\u5f0f\u5206\u89e3(2x\uff0b1)(x\uff0d3)\uff0d(2x\uff0b1)(x\uff0d5)\uff1d
73.\u56e0\u5f0f\u5206\u89e3xy\uff0b2x\uff0d5y\uff0d10\uff1d
74.\u56e0\u5f0f\u5206\u89e3x2y2\uff0dx2\uff0dy2\uff0d6xy\uff0b4\uff1d
x3\uff0b2x2\uff0b2x\uff0b1
a2b2\uff0da2\uff0db2\uff0b1
(1)3ax2\uff0d2x\uff0b3ax\uff0d2
(x2\uff0d3x)\uff0b(x\uff0d3)2\uff0b2x\uff0d6
1)(2x\uff0b3)(x\uff0d2)\uff0b(x\uff0b1)(2x\uff0b3)
9x2\uff0d66x\uff0b121
17.\u56e0\u5f0f\u5206\u89e3
(1)8x2\uff0d18 (2)x2\uff0d(a\uff0db)x\uff0dab
18.\u56e0\u5f0f\u5206\u89e3\u4e0b\u5217\u5404\u5f0f
(1)9x4\uff0b35x2\uff0d4 (2)x2\uff0dy2\uff0d2yz\uff0dz2
(3)a(b2\uff0dc2)\uff0dc(a2\uff0db2)
19.\u56e0\u5f0f\u5206\u89e3(2x\uff0b1)(x\uff0b1)\uff0b(2x\uff0b1)(x\uff0d3)
20.\u56e0\u5f0f\u5206\u89e339x2\uff0d38x\uff0b8
21.\u5229\u7528\u56e0\u5f0f\u5206\u89e3\u6c42(6512 )2\uff0d(3412 )2\u4e4b\u503c
22.\u56e0\u5f0f\u5206\u89e3a(b2\uff0dc2)\uff0dc(a2\uff0db2)
24.\u56e0\u5f0f\u5206\u89e37(x\uff0d1)2\uff0b4(x\uff0d1)(y\uff0b2)\uff0d20(y+2)2
25.\u56e0\u5f0f\u5206\u89e3xy2\uff0d2xy\uff0d3x\uff0dy2\uff0d2y\uff0d1
26.\u56e0\u5f0f\u5206\u89e34x2\uff0d6ax\uff0b18a2
27.\u56e0\u5f0f\u5206\u89e320a3bc\uff0d9a2b2c\uff0d20ab3c
28.\u56e0\u5f0f\u5206\u89e32ax2\uff0d5x\uff0b2ax\uff0d5
29.\u56e0\u5f0f\u5206\u89e34x3\uff0b4x2\uff0d25x\uff0d25
30.\u56e0\u5f0f\u5206\u89e3(1\uff0dxy)2\uff0d(y\uff0dx)2
31.\u56e0\u5f0f\u5206\u89e3
(1)mx2\uff0dm2\uff0dx\uff0b1 (2)a2\uff0d2ab\uff0bb2\uff0d1
32.\u56e0\u5f0f\u5206\u89e3\u4e0b\u5217\u5404\u5f0f
(1)5x2\uff0d45 (2)81x3\uff0d9x (3)x2\uff0dy2\uff0d5x\uff0d5y (4)x2\uff0dy2\uff0b2yz\uff0dz2
33.\u56e0\u5f0f\u5206\u89e3\uff1axy2\uff0d2xy\uff0d3x\uff0dy2\uff0d2y\uff0d1
34.\u56e0\u5f0f\u5206\u89e3y2(x\uff0dy)\uff0bz2(y\uff0dx)
1)\u56e0\u5f0f\u5206\u89e3x2\uff0bx\uff0by2\uff0dy\uff0d2xy\uff1d
\u5f88\u9ad8\u5174\u80fd\u5e2e\u5230\u4f60~~!!\u6211\u5728\u5404\u4e2a\u5730\u65b9\u627e\u5230\u6ef4\u90fd\u4e00\u70b9\u70b9\u6253\u5230\u4e0a\u9762\u4e86\uff0c\u9009\u6211\u4e3a\u6700\u4f73\u7b54\u6848\u5594
1.\u628a\u4e0b\u5217\u5404\u5f0f\u5206\u89e3\u56e0\u5f0f
\uff081\uff0912a3b2\uff0d9a2b+3ab;
\uff082\uff09a\uff08x+y\uff09\uff0d\uff08a\uff0db\uff09\uff08x+y\uff09;
\uff083\uff09121x2\uff0d144y2;
\uff084\uff094\uff08a\uff0db\uff092\uff0d\uff08x\uff0dy\uff092;
\uff085\uff09\uff08x\uff0d2\uff092+10\uff08x\uff0d2\uff09+25;
\uff086\uff09a3\uff08x+y\uff092\uff0d4a3c2.
2.\u7528\u7b80\u4fbf\u65b9\u6cd5\u8ba1\u7b97
\uff081\uff096.42\uff0d3.62;
\uff082\uff0921042\uff0d1042
\uff083\uff091.42\u00d79\uff0d2.32\u00d736
\u7b2c\u4e8c\u7ae0 \u5206\u89e3\u56e0\u5f0f\u7efc\u5408\u7ec3\u4e60
\u4e00\u3001\u9009\u62e9\u9898
1.\u4e0b\u5217\u5404\u5f0f\u4e2d\u4ece\u5de6\u5230\u53f3\u7684\u53d8\u5f62\uff0c\u662f\u56e0\u5f0f\u5206\u89e3\u7684\u662f\uff08 \uff09
(A)(a+3)(a-3)=a2-9 (B)x2+x-5=(x-2)(x+3)+1
(C)a2b+ab2=ab(a+b) (D)x2+1=x(x+ )
2.\u4e0b\u5217\u5404\u5f0f\u7684\u56e0\u5f0f\u5206\u89e3\u4e2d\u6b63\u786e\u7684\u662f\uff08 \uff09
(A)-a2+ab-ac= -a(a+b-c) (B)9xyz-6x2y2=3xyz(3-2xy)
(C)3a2x-6bx+3x=3x(a2-2b) (D) xy2+ x2y= xy(x+y)
3.\u628a\u591a\u9879\u5f0fm2(a-2)+m(2-a)\u5206\u89e3\u56e0\u5f0f\u7b49\u4e8e\uff08 \uff09
(A)(a-2)(m2+m) (B)(a-2)(m2-m) (C)m(a-2)(m-1) (D)m(a-2)(m+1)
4.\u4e0b\u5217\u591a\u9879\u5f0f\u80fd\u5206\u89e3\u56e0\u5f0f\u7684\u662f\uff08 \uff09
(A)x2-y (B)x2+1 (C)x2+y+y2 (D)x2-4x+4
5.\u4e0b\u5217\u591a\u9879\u5f0f\u4e2d\uff0c\u4e0d\u80fd\u7528\u5b8c\u5168\u5e73\u65b9\u516c\u5f0f\u5206\u89e3\u56e0\u5f0f\u7684\u662f\uff08 \uff09
(A) (B) (C) (D)
6.\u591a\u9879\u5f0f4x2+1\u52a0\u4e0a\u4e00\u4e2a\u5355\u9879\u5f0f\u540e\uff0c\u4f7f\u5b83\u80fd\u6210\u4e3a\u4e00\u4e2a\u6574\u5f0f\u7684\u5b8c\u5168\u5e73\u65b9\uff0c\u5219\u52a0\u4e0a\u7684\u5355\u9879\u5f0f\u4e0d\u53ef\u4ee5\u662f\uff08 \uff09
(A)4x (B)-4x (C)4x4 (D)-4x4
7.\u4e0b\u5217\u5206\u89e3\u56e0\u5f0f\u9519\u8bef\u7684\u662f\uff08 \uff09
(A)15a2+5a=5a(3a+1) (B)-x2-y2= -(x2-y2)= -(x+y)(x-y)
(C)k(x+y)+x+y=(k+1)(x+y) (D)a3-2a2+a=a(a-1)2
8.\u4e0b\u5217\u591a\u9879\u5f0f\u4e2d\u4e0d\u80fd\u7528\u5e73\u65b9\u5dee\u516c\u5f0f\u5206\u89e3\u7684\u662f\uff08 \uff09
(A)-a2+b2 (B)-x2-y2 (C)49x2y2-z2 (D)16m4-25n2p2
9.\u4e0b\u5217\u591a\u9879\u5f0f\uff1a\u246016x5-x\uff1b\u2461(x-1)2-4(x-1)+4\uff1b\u2462(x+1)4-4x(x+1)+4x2\uff1b\u2463-4x2-1+4x\uff0c\u5206\u89e3\u56e0\u5f0f\u540e\uff0c\u7ed3\u679c\u542b\u6709\u76f8\u540c\u56e0\u5f0f\u7684\u662f\uff08 \uff09
(A)\u2460\u2461 (B)\u2461\u2463 (C)\u2462\u2463 (D)\u2461\u2462
10.\u4e24\u4e2a\u8fde\u7eed\u7684\u5947\u6570\u7684\u5e73\u65b9\u5dee\u603b\u53ef\u4ee5\u88ab k\u6574\u9664\uff0c\u5219k\u7b49\u4e8e\uff08 \uff09
(A)4 (B)8 (C)4\u6216-4 (D)8\u7684\u500d\u6570
\u4e8c\u3001\u586b\u7a7a\u9898
11.\u5206\u89e3\u56e0\u5f0f\uff1am3-4m= .
12.\u5df2\u77e5x+y=6\uff0cxy=4\uff0c\u5219x2y+xy2\u7684\u503c\u4e3a .
13.\u5c06xn-yn\u5206\u89e3\u56e0\u5f0f\u7684\u7ed3\u679c\u4e3a(x2+y2)(x+y)(x-y)\uff0c\u5219n\u7684\u503c\u4e3a .
14.\u82e5ax2+24x+b=(mx-3)2\uff0c\u5219a= \uff0cb= \uff0cm= . (\u7b2c15\u9898\u56fe)
15.\u89c2\u5bdf\u56fe\u5f62\uff0c\u6839\u636e\u56fe\u5f62\u9762\u79ef\u7684\u5173\u7cfb\uff0c\u4e0d\u9700\u8981\u8fde\u5176\u4ed6\u7684\u7ebf\uff0c\u4fbf\u53ef\u4ee5\u5f97\u5230\u4e00\u4e2a\u7528\u6765\u5206\u89e3\u56e0\u5f0f\u7684\u516c\u5f0f\uff0c\u8fd9\u4e2a\u516c\u5f0f\u662f .
\u4e09\u3001(\u6bcf\u5c0f\u98986\u5206\uff0c\u517124\u5206)
16.\u5206\u89e3\u56e0\u5f0f\uff1a(1)-4x3+16x2-26x (2) a2(x-2a)2- a(2a-x)3
\uff083\uff0956x3yz+14x2y2z\uff0d21xy2z2 (4)mn(m\uff0dn)\uff0dm(n\uff0dm)
17.\u5206\u89e3\u56e0\u5f0f\uff1a(1) 4xy\u2013(x2-4y2) (2)- (2a-b)2+4(a - b)2
18.\u5206\u89e3\u56e0\u5f0f\uff1a(1)-3ma3+6ma2-12ma (2) a2(x-y)+b2(y-x)
19\u3001\u5206\u89e3\u56e0\u5f0f
\uff081\uff09 \uff1b \uff082\uff09 \uff1b
\uff083\uff09 \uff1b
20.\u5206\u89e3\u56e0\u5f0f\uff1a(1) ax2y2+2axy+2a (2)(x2-6x)2+18(x2-6x)+81 (3) \u20132x2n-4xn
21\uff0e\u5c06\u4e0b\u5217\u5404\u5f0f\u5206\u89e3\u56e0\u5f0f\uff1a
\uff081\uff09 \uff1b \uff082\uff09 \uff1b \uff083\uff09 \uff1b
22\uff0e\u5206\u89e3\u56e0\u5f0f\uff081\uff09 \uff1b \uff082\uff09 \uff1b
23.\u7528\u7b80\u4fbf\u65b9\u6cd5\u8ba1\u7b97\uff1a
(1)57.6\u00d71.6+28.8\u00d736.8-14.4\u00d780 (2)39\u00d737-13\u00d734
\uff083\uff09\uff0e13.7
24\uff0e\u8bd5\u8bf4\u660e\uff1a\u4e24\u4e2a\u8fde\u7eed\u5947\u6570\u7684\u5e73\u65b9\u5dee\u662f\u8fd9\u4e24\u4e2a\u8fde\u7eed\u5947\u6570\u548c\u76842\u500d\u3002
25\uff0e\u5982\u56fe\uff0c\u5728\u4e00\u5757\u8fb9\u957f\u4e3aa\u5398\u7c73\u7684\u6b63\u65b9\u5f62\u7eb8\u677f\u56db\u89d2\uff0c\u5404\u526a\u53bb\u4e00\u4e2a\u8fb9\u957f\u4e3a b(b< )\u5398\u7c73\u7684\u6b63\u65b9\u5f62\uff0c\u5229\u7528\u56e0\u5f0f\u5206\u89e3\u8ba1\u7b97\u5f53a=13.2\uff0cb=3.4\u65f6\uff0c\u5269\u4f59\u90e8\u5206\u7684\u9762\u79ef\u3002
26\uff0e\u5c06\u4e0b\u5217\u5404\u5f0f\u5206\u89e3\u56e0\u5f0f
\uff081\uff09
\uff082\uff09 \uff1b
(3) (4)
(5)
(6)
(7) (8)
(9) \uff0810\uff09(x2+y2)2-4x2y2
\uff0812\uff09\uff0ex6n+2+2x3n+2+x2 \uff0813\uff09\uff0e9(a+1)2(a-1)2-6(a2-1)(b2-1)+(b+1)2(b-1)2
27.\u5df2\u77e5(4x-2y-1)2+ =0\uff0c\u6c424x2y-4x2y2+xy2\u7684\u503c.
28\uff0e\u5df2\u77e5\uff1aa=10000\uff0cb=9999\uff0c\u6c42a2+b2\uff0d2ab\uff0d6a+6b+9\u7684\u503c\u3002
29\uff0e\u8bc1\u660e58-1\u89e3\u88ab20\u223d30\u4e4b\u95f4\u7684\u4e24\u4e2a\u6574\u6570\u6574\u9664
30.\u5199\u4e00\u4e2a\u591a\u9879\u5f0f\uff0c\u518d\u628a\u5b83\u5206\u89e3\u56e0\u5f0f(\u8981\u6c42\uff1a\u591a\u9879\u5f0f\u542b\u6709\u5b57\u6bcdm\u548cn\uff0c\u7cfb\u6570\u3001\u6b21\u6570\u4e0d\u9650\uff0c\u5e76\u80fd\u5148\u7528\u63d0\u53d6\u516c\u56e0\u5f0f\u6cd5\u518d\u7528\u516c\u5f0f\u6cd5\u5206\u89e3).
31.\u89c2\u5bdf\u4e0b\u5217\u5404\u5f0f\uff1a
12+(1\u00d72)2+22=9=32
22+(2\u00d73)2+32=49=72
32+(3\u00d74)2+42=169=132
\u2026\u2026
\u4f60\u53d1\u73b0\u4e86\u4ec0\u4e48\u89c4\u5f8b\uff1f\u8bf7\u7528\u542b\u6709n(n\u4e3a\u6b63\u6574\u6570)\u7684\u7b49\u5f0f\u8868\u793a\u51fa\u6765\uff0c\u5e76\u8bf4\u660e\u5176\u4e2d\u7684\u9053\u7406.
32.\u9605\u8bfb\u4e0b\u5217\u56e0\u5f0f\u5206\u89e3\u7684\u8fc7\u7a0b\uff0c\u518d\u56de\u7b54\u6240\u63d0\u51fa\u7684\u95ee\u9898\uff1a
1+x+x(x+1)+x(x+1)2=(1+x)[1+x+x(x+1)]
=(1+x)2(1+x)
=(1+x)3
(1)\u4e0a\u8ff0\u5206\u89e3\u56e0\u5f0f\u7684\u65b9\u6cd5\u662f \uff0c\u5171\u5e94\u7528\u4e86 \u6b21.
(2)\u82e5\u5206\u89e31+x+x(x+1)+x(x+1)2+\u2026+ x(x+1)2004\uff0c\u5219\u9700\u5e94\u7528\u4e0a\u8ff0\u65b9\u6cd5 \u6b21\uff0c\u7ed3\u679c\u662f .
(3)\u5206\u89e3\u56e0\u5f0f\uff1a1+x+x(x+1)+x(x+1)2+\u2026+ x(x+1)n(n\u4e3a\u6b63\u6574\u6570).
34\uff0e\u82e5a\u3001b\u3001c\u4e3a\u25b3ABC\u7684\u4e09\u8fb9\uff0c\u4e14\u6ee1\u8db3a2+b2+c2\uff0dab\uff0dbc\uff0dca=0\u3002\u63a2\u7d22\u25b3ABC\u7684\u5f62\u72b6\uff0c\u5e76\u8bf4\u660e\u7406\u7531\u3002
35\uff0e\u9605\u8bfb\u4e0b\u5217\u8ba1\u7b97\u8fc7\u7a0b\uff1a
99\u00d799+199=992+2\u00d799+1=\uff0899+1\uff092=100 2=10 4
1\uff0e\u8ba1\u7b97\uff1a
999\u00d7999+1999=____________=_______________=_____________=_____________\uff1b
9999\u00d79999+19999=__________=_______________=______________=_______________\u3002
2\uff0e\u731c\u60f39999999999\u00d79999999999+19999999999\u7b49\u4e8e\u591a\u5c11\uff1f\u5199\u51fa\u8ba1\u7b97\u8fc7\u7a0b\u3002
36.\u6709\u82e5\u5e72\u4e2a\u5927\u5c0f\u76f8\u540c\u7684\u5c0f\u7403\u4e00\u4e2a\u6328\u4e00\u4e2a\u6446\u653e\uff0c\u521a\u597d\u6446\u6210\u4e00\u4e2a\u7b49\u8fb9\u4e09\u89d2\u5f62(\u5982\u56fe1)\uff1b\u5c06\u8fd9\u4e9b\u5c0f\u7403\u6362\u4e00\u79cd\u6446\u6cd5\uff0c\u4ecd\u4e00\u4e2a\u6328\u4e00\u4e2a\u6446\u653e\uff0c\u53c8\u521a\u597d\u6446\u6210\u4e00\u4e2a\u6b63\u65b9\u5f62(\u5982\u56fe2).\u8bd5\u95ee\uff1a\u8fd9\u79cd\u5c0f\u7403\u6700\u5c11\u6709\u591a\u5c11\u4e2a\uff1f
\u56fe1 \u56fe2
一、填空题:
2.(a-3)(3-2a)=_______(3-a)(3-2a);
12.若m2-3m+2=(m+a)(m+b),则a=______,b=______;
15.当m=______时,x2+2(m-3)x+25是完全平方式.
二、选择题:
1.下列各式的因式分解结果中,正确的是
[ ]
A.a2b+7ab-b=b(a2+7a)
B.3x2y-3xy-6y=3y(x-2)(x+1)
C.8xyz-6x2y2=2xyz(4-3xy)
D.-2a2+4ab-6ac=-2a(a+2b-3c)
2.多项式m(n-2)-m2(2-n)分解因式等于
[ ]
A.(n-2)(m+m2) B.(n-2)(m-m2)
C.m(n-2)(m+1) D.m(n-2)(m-1)
3.在下列等式中,属于因式分解的是
[ ]
A.a(x-y)+b(m+n)=ax+bm-ay+bn
B.a2-2ab+b2+1=(a-b)2+1
C.-4a2+9b2=(-2a+3b)(2a+3b)
D.x2-7x-8=x(x-7)-8
4.下列各式中,能用平方差公式分解因式的是
[ ]
A.a2+b2 B.-a2+b2
C.-a2-b2 D.-(-a2)+b2
5.若9x2+mxy+16y2是一个完全平方式,那么m的值是
[ ]
A.-12 B.±24
C.12 D.±12
6.把多项式an+4-an+1分解得
[ ]
A.an(a4-a) B.an-1(a3-1)
C.an+1(a-1)(a2-a+1) D.an+1(a-1)(a2+a+1)
7.若a2+a=-1,则a4+2a3-3a2-4a+3的值为
[ ]
A.8 B.7
C.10 D.12
8.已知x2+y2+2x-6y+10=0,那么x,y的值分别为
[ ]
A.x=1,y=3 B.x=1,y=-3
C.x=-1,y=3 D.x=1,y=-3
9.把(m2+3m)4-8(m2+3m)2+16分解因式得
[ ]
A.(m+1)4(m+2)2 B.(m-1)2(m-2)2(m2+3m-2)
C.(m+4)2(m-1)2 D.(m+1)2(m+2)2(m2+3m-2)2
10.把x2-7x-60分解因式,得
[ ]
A.(x-10)(x+6) B.(x+5)(x-12)
C.(x+3)(x-20) D.(x-5)(x+12)
11.把3x2-2xy-8y2分解因式,得
[ ]
A.(3x+4)(x-2) B.(3x-4)(x+2)
C.(3x+4y)(x-2y) D.(3x-4y)(x+2y)
12.把a2+8ab-33b2分解因式,得
[ ]
A.(a+11)(a-3) B.(a-11b)(a-3b)
C.(a+11b)(a-3b) D.(a-11b)(a+3b)
13.把x4-3x2+2分解因式,得
[ ]
A.(x2-2)(x2-1) B.(x2-2)(x+1)(x-1)
C.(x2+2)(x2+1) D.(x2+2)(x+1)(x-1)
14.多项式x2-ax-bx+ab可分解因式为
[ ]
A.-(x+a)(x+b) B.(x-a)(x+b)
C.(x-a)(x-b) D.(x+a)(x+b)
15.一个关于x的二次三项式,其x2项的系数是1,常数项是-12,且能分解因式,这样的二次三项式是
[ ]
A.x2-11x-12或x2+11x-12
B.x2-x-12或x2+x-12
C.x2-4x-12或x2+4x-12
D.以上都可以
16.下列各式x3-x2-x+1,x2+y-xy-x,x2-2x-y2+1,(x2+3x)2-(2x+1)2中,不含有(x-1)因式的有
[ ]
A.1个 B.2个
C.3个 D.4个
17.把9-x2+12xy-36y2分解因式为
[ ]
A.(x-6y+3)(x-6x-3)
B.-(x-6y+3)(x-6y-3)
C.-(x-6y+3)(x+6y-3)
D.-(x-6y+3)(x-6y+3)
18.下列因式分解错误的是
[ ]
A.a2-bc+ac-ab=(a-b)(a+c)
B.ab-5a+3b-15=(b-5)(a+3)
C.x2+3xy-2x-6y=(x+3y)(x-2)
D.x2-6xy-1+9y2=(x+3y+1)(x+3y-1)
19.已知a2x2±2x+b2是完全平方式,且a,b都不为零,则a与b的关系为
[ ]
A.互为倒数或互为负倒数 B.互为相反数
C.相等的数 D.任意有理数
20.对x4+4进行因式分解,所得的正确结论是
[ ]
A.不能分解因式 B.有因式x2+2x+2
C.(xy+2)(xy-8) D.(xy-2)(xy-8)
21.把a4+2a2b2+b4-a2b2分解因式为
[ ]
A.(a2+b2+ab)2 B.(a2+b2+ab)(a2+b2-ab)
C.(a2-b2+ab)(a2-b2-ab) D.(a2+b2-ab)2
22.-(3x-1)(x+2y)是下列哪个多项式的分解结果
[ ]
A.3x2+6xy-x-2y B.3x2-6xy+x-2y
C.x+2y+3x2+6xy D.x+2y-3x2-6xy
23.64a8-b2因式分解为
[ ]
A.(64a4-b)(a4+b) B.(16a2-b)(4a2+b)
C.(8a4-b)(8a4+b) D.(8a2-b)(8a4+b)
24.9(x-y)2+12(x2-y2)+4(x+y)2因式分解为
[ ]
A.(5x-y)2 B.(5x+y)2
C.(3x-2y)(3x+2y) D.(5x-2y)2
25.(2y-3x)2-2(3x-2y)+1因式分解为
[ ]
A.(3x-2y-1)2 B.(3x+2y+1)2
C.(3x-2y+1)2 D.(2y-3x-1)2
26.把(a+b)2-4(a2-b2)+4(a-b)2分解因式为
[ ]
A.(3a-b)2 B.(3b+a)2
C.(3b-a)2 D.(3a+b)2
27.把a2(b+c)2-2ab(a-c)(b+c)+b2(a-c)2分解因式为
[ ]
A.c(a+b)2 B.c(a-b)2
C.c2(a+b)2 D.c2(a-b)
28.若4xy-4x2-y2-k有一个因式为(1-2x+y),则k的值为
[ ]
A.0 B.1
C.-1 D.4
29.分解因式3a2x-4b2y-3b2x+4a2y,正确的是
[ ]
A.-(a2+b2)(3x+4y) B.(a-b)(a+b)(3x+4y)
C.(a2+b2)(3x-4y) D.(a-b)(a+b)(3x-4y)
30.分解因式2a2+4ab+2b2-8c2,正确的是
[ ]
A.2(a+b-2c) B.2(a+b+c)(a+b-c)
C.(2a+b+4c)(2a+b-4c) D.2(a+b+2c)(a+b-2c)
三、因式分解:
1.m2(p-q)-p+q;
2.a(ab+bc+ac)-abc;
3.x4-2y4-2x3y+xy3;
4.abc(a2+b2+c2)-a3bc+2ab2c2;
5.a2(b-c)+b2(c-a)+c2(a-b);
6.(x2-2x)2+2x(x-2)+1;
7.(x-y)2+12(y-x)z+36z2;
8.x2-4ax+8ab-4b2;
9.(ax+by)2+(ay-bx)2+2(ax+by)(ay-bx);
10.(1-a2)(1-b2)-(a2-1)2(b2-1)2;
11.(x+1)2-9(x-1)2;
12.4a2b2-(a2+b2-c2)2;
13.ab2-ac2+4ac-4a;
14.x3n+y3n;
15.(x+y)3+125;
16.(3m-2n)3+(3m+2n)3;
17.x6(x2-y2)+y6(y2-x2);
18.8(x+y)3+1;
19.(a+b+c)3-a3-b3-c3;
20.x2+4xy+3y2;
21.x2+18x-144;
22.x4+2x2-8;
23.-m4+18m2-17;
24.x5-2x3-8x;
25.x8+19x5-216x2;
26.(x2-7x)2+10(x2-7x)-24;
27.5+7(a+1)-6(a+1)2;
28.(x2+x)(x2+x-1)-2;
29.x2+y2-x2y2-4xy-1;
30.(x-1)(x-2)(x-3)(x-4)-48;
31.x2-y2-x-y;
32.ax2-bx2-bx+ax-3a+3b;
33.m4+m2+1;
34.a2-b2+2ac+c2;
35.a3-ab2+a-b;
36.625b4-(a-b)4;
37.x6-y6+3x2y4-3x4y2;
38.x2+4xy+4y2-2x-4y-35;
39.m2-a2+4ab-4b2;
40.5m-5n-m2+2mn-n2.
四、证明(求值):
1.已知a+b=0,求a3-2b3+a2b-2ab2的值.
2.求证:四个连续自然数的积再加上1,一定是一个完全平方数.
3.证明:(ac-bd)2+(bc+ad)2=(a2+b2)(c2+d2).
4.已知a=k+3,b=2k+2,c=3k-1,求a2+b2+c2+2ab-2bc-2ac的值.
5.若x2+mx+n=(x-3)(x+4),求(m+n)2的值.
6.当a为何值时,多项式x2+7xy+ay2-5x+43y-24可以分解为两个一次因式的乘积.
7.若x,y为任意有理数,比较6xy与x2+9y2的大小.
8.两个连续偶数的平方差是4的倍数.
参考答案:
一、填空题:
7.9,(3a-1)
10.x-5y,x-5y,x-5y,2a-b
11.+5,-2
12.-1,-2(或-2,-1)
14.bc+ac,a+b,a-c
15.8或-2
二、选择题:
1.B 2.C 3.C 4.B 5.B 6.D 7.A 8.C 9.D 10.B 11.C 12.C 13.B 14.C 15.D 16.B 17.B 18.D 19.A 20.B 21.B 22.D 23.C 24.A 25.A 26.C 27.C 28.C 29.D 30.D
三、因式分解:
1.(p-q)(m-1)(m+1).
8.(x-2b)(x-4a+2b).
11.4(2x-1)(2-x).
20.(x+3y)(x+y).
21.(x-6)(x+24).
27.(3+2a)(2-3a).
31.(x+y)(x-y-1).
38.(x+2y-7)(x+2y+5).
四、证明(求值):
2.提示:设四个连续自然数为n,n+1,n+2,n+3
6.提示:a=-18.
∴a=-18.
因式分解练习题
一、填空题:
2.(a-3)(3-2a)=_______(3-a)(3-2a);
12.若m2-3m+2=(m+a)(m+b),则a=______,b=______;
15.当m=______时,x2+2(m-3)x+25是完全平方式.
二、选择题:
1.下列各式的因式分解结果中,正确的是
[ ]
A.a2b+7ab-b=b(a2+7a)
B.3x2y-3xy-6y=3y(x-2)(x+1)
C.8xyz-6x2y2=2xyz(4-3xy)
D.-2a2+4ab-6ac=-2a(a+2b-3c)
2.多项式m(n-2)-m2(2-n)分解因式等于
[ ]
A.(n-2)(m+m2) B.(n-2)(m-m2)
C.m(n-2)(m+1) D.m(n-2)(m-1)
3.在下列等式中,属于因式分解的是
[ ]
A.a(x-y)+b(m+n)=ax+bm-ay+bn
B.a2-2ab+b2+1=(a-b)2+1
C.-4a2+9b2=(-2a+3b)(2a+3b)
D.x2-7x-8=x(x-7)-8
4.下列各式中,能用平方差公式分解因式的是
[ ]
A.a2+b2 B.-a2+b2
C.-a2-b2 D.-(-a2)+b2
5.若9x2+mxy+16y2是一个完全平方式,那么m的值是
[ ]
A.-12 B.±24
C.12 D.±12
6.把多项式an+4-an+1分解得
[ ]
A.an(a4-a) B.an-1(a3-1)
C.an+1(a-1)(a2-a+1) D.an+1(a-1)(a2+a+1)
7.若a2+a=-1,则a4+2a3-3a2-4a+3的值为
[ ]
A.8 B.7
C.10 D.12
8.已知x2+y2+2x-6y+10=0,那么x,y的值分别为
[ ]
A.x=1,y=3 B.x=1,y=-3
C.x=-1,y=3 D.x=1,y=-3
9.把(m2+3m)4-8(m2+3m)2+16分解因式得
[ ]
A.(m+1)4(m+2)2 B.(m-1)2(m-2)2(m2+3m-2)
C.(m+4)2(m-1)2 D.(m+1)2(m+2)2(m2+3m-2)2
10.把x2-7x-60分解因式,得
[ ]
A.(x-10)(x+6) B.(x+5)(x-12)
C.(x+3)(x-20) D.(x-5)(x+12)
11.把3x2-2xy-8y2分解因式,得
[ ]
A.(3x+4)(x-2) B.(3x-4)(x+2)
C.(3x+4y)(x-2y) D.(3x-4y)(x+2y)
12.把a2+8ab-33b2分解因式,得
[ ]
A.(a+11)(a-3) B.(a-11b)(a-3b)
C.(a+11b)(a-3b) D.(a-11b)(a+3b)
13.把x4-3x2+2分解因式,得
[ ]
A.(x2-2)(x2-1) B.(x2-2)(x+1)(x-1)
C.(x2+2)(x2+1) D.(x2+2)(x+1)(x-1)
14.多项式x2-ax-bx+ab可分解因式为
[ ]
A.-(x+a)(x+b) B.(x-a)(x+b)
C.(x-a)(x-b) D.(x+a)(x+b)
15.一个关于x的二次三项式,其x2项的系数是1,常数项是-12,且能分解因式,这样的二次三项式是
[ ]
A.x2-11x-12或x2+11x-12
B.x2-x-12或x2+x-12
C.x2-4x-12或x2+4x-12
D.以上都可以
16.下列各式x3-x2-x+1,x2+y-xy-x,x2-2x-y2+1,(x2+3x)2-(2x+1)2中,不含有(x-1)因式的有
[ ]
A.1个 B.2个
C.3个 D.4个
17.把9-x2+12xy-36y2分解因式为
[ ]
A.(x-6y+3)(x-6x-3)
B.-(x-6y+3)(x-6y-3)
C.-(x-6y+3)(x+6y-3)
D.-(x-6y+3)(x-6y+3)
18.下列因式分解错误的是
[ ]
A.a2-bc+ac-ab=(a-b)(a+c)
B.ab-5a+3b-15=(b-5)(a+3)
C.x2+3xy-2x-6y=(x+3y)(x-2)
D.x2-6xy-1+9y2=(x+3y+1)(x+3y-1)
19.已知a2x2±2x+b2是完全平方式,且a,b都不为零,则a与b的关系为
[ ]
A.互为倒数或互为负倒数 B.互为相反数
C.相等的数 D.任意有理数
20.对x4+4进行因式分解,所得的正确结论是
[ ]
A.不能分解因式 B.有因式x2+2x+2
C.(xy+2)(xy-8) D.(xy-2)(xy-8)
21.把a4+2a2b2+b4-a2b2分解因式为
[ ]
A.(a2+b2+ab)2 B.(a2+b2+ab)(a2+b2-ab)
C.(a2-b2+ab)(a2-b2-ab) D.(a2+b2-ab)2
22.-(3x-1)(x+2y)是下列哪个多项式的分解结果
[ ]
A.3x2+6xy-x-2y B.3x2-6xy+x-2y
C.x+2y+3x2+6xy D.x+2y-3x2-6xy
23.64a8-b2因式分解为
[ ]
A.(64a4-b)(a4+b) B.(16a2-b)(4a2+b)
C.(8a4-b)(8a4+b) D.(8a2-b)(8a4+b)
24.9(x-y)2+12(x2-y2)+4(x+y)2因式分解为
[ ]
A.(5x-y)2 B.(5x+y)2
C.(3x-2y)(3x+2y) D.(5x-2y)2
25.(2y-3x)2-2(3x-2y)+1因式分解为
[ ]
A.(3x-2y-1)2 B.(3x+2y+1)2
C.(3x-2y+1)2 D.(2y-3x-1)2
26.把(a+b)2-4(a2-b2)+4(a-b)2分解因式为
[ ]
A.(3a-b)2 B.(3b+a)2
C.(3b-a)2 D.(3a+b)2
27.把a2(b+c)2-2ab(a-c)(b+c)+b2(a-c)2分解因式为
[ ]
A.c(a+b)2 B.c(a-b)2
C.c2(a+b)2 D.c2(a-b)
28.若4xy-4x2-y2-k有一个因式为(1-2x+y),则k的值为
[ ]
A.0 B.1
C.-1 D.4
29.分解因式3a2x-4b2y-3b2x+4a2y,正确的是
[ ]
A.-(a2+b2)(3x+4y) B.(a-b)(a+b)(3x+4y)
C.(a2+b2)(3x-4y) D.(a-b)(a+b)(3x-4y)
30.分解因式2a2+4ab+2b2-8c2,正确的是
[ ]
A.2(a+b-2c) B.2(a+b+c)(a+b-c)
C.(2a+b+4c)(2a+b-4c) D.2(a+b+2c)(a+b-2c)
三、因式分解:
1.m2(p-q)-p+q;
2.a(ab+bc+ac)-abc;
3.x4-2y4-2x3y+xy3;
4.abc(a2+b2+c2)-a3bc+2ab2c2;
5.a2(b-c)+b2(c-a)+c2(a-b);
6.(x2-2x)2+2x(x-2)+1;
7.(x-y)2+12(y-x)z+36z2;
8.x2-4ax+8ab-4b2;
9.(ax+by)2+(ay-bx)2+2(ax+by)(ay-bx);
10.(1-a2)(1-b2)-(a2-1)2(b2-1)2;
11.(x+1)2-9(x-1)2;
12.4a2b2-(a2+b2-c2)2;
13.ab2-ac2+4ac-4a;
14.x3n+y3n;
15.(x+y)3+125;
16.(3m-2n)3+(3m+2n)3;
17.x6(x2-y2)+y6(y2-x2);
18.8(x+y)3+1;
19.(a+b+c)3-a3-b3-c3;
20.x2+4xy+3y2;
21.x2+18x-144;
22.x4+2x2-8;
23.-m4+18m2-17;
24.x5-2x3-8x;
25.x8+19x5-216x2;
26.(x2-7x)2+10(x2-7x)-24;
27.5+7(a+1)-6(a+1)2;
28.(x2+x)(x2+x-1)-2;
29.x2+y2-x2y2-4xy-1;
30.(x-1)(x-2)(x-3)(x-4)-48;
31.x2-y2-x-y;
32.ax2-bx2-bx+ax-3a+3b;
33.m4+m2+1;
34.a2-b2+2ac+c2;
35.a3-ab2+a-b;
36.625b4-(a-b)4;
37.x6-y6+3x2y4-3x4y2;
38.x2+4xy+4y2-2x-4y-35;
39.m2-a2+4ab-4b2;
40.5m-5n-m2+2mn-n2.
四、证明(求值):
1.已知a+b=0,求a3-2b3+a2b-2ab2的值.
2.求证:四个连续自然数的积再加上1,一定是一个完全平方数.
3.证明:(ac-bd)2+(bc+ad)2=(a2+b2)(c2+d2).
4.已知a=k+3,b=2k+2,c=3k-1,求a2+b2+c2+2ab-2bc-2ac的值.
5.若x2+mx+n=(x-3)(x+4),求(m+n)2的值.
6.当a为何值时,多项式x2+7xy+ay2-5x+43y-24可以分解为两个一次因式的乘积.
7.若x,y为任意有理数,比较6xy与x2+9y2的大小.
8.两个连续偶数的平方差是4的倍数.
参考答案:
一、填空题:
7.9,(3a-1)
10.x-5y,x-5y,x-5y,2a-b
11.+5,-2
12.-1,-2(或-2,-1)
14.bc+ac,a+b,a-c
15.8或-2
二、选择题:
1.B 2.C 3.C 4.B 5.B 6.D 7.A 8.C 9.D 10.B 11.C 12.C 13.B 14.C 15.D 16.B 17.B 18.D 19.A 20.B 21.B 22.D 23.C 24.A 25.A 26.C 27.C 28.C 29.D 30.D
三、因式分解:
1.(p-q)(m-1)(m+1).
8.(x-2b)(x-4a+2b).
11.4(2x-1)(2-x).
20.(x+3y)(x+y).
21.(x-6)(x+24).
27.(3+2a)(2-3a).
31.(x+y)(x-y-1).
38.(x+2y-7)(x+2y+5).
四、证明(求值):
2.提示:设四个连续自然数为n,n+1,n+2,n+3
6.提示:a=-18.
∴a=-18.
1. (4x+3y)2=16x2+9y2 ( )
2. (a-b)的平方等于(b-a)的平方. ( )
单选
4. 若(2a+3b)2=(2a-3b)2+( )成立, 则括号内的式子是 [ ]
A.6ab B.24ab C.12ab D.18ab
5. 若(x-y)2=0, 下面成立的等式是 [ ]
A.x2+y2=2xy B.x2+y2=-2xy C.x2+y2=0 D.2x2-y2=0
6. 下列等式成立的是 [ ]
A.(a-b)2=a2-ab+b2 B.(a+3b)2=a2+9b2
C.(a+b)(a-b)=(b+a)(-b+a) D. (x-9)(x+9)=x2-9
答案
1. ×
2. √
3. √
4. B
5. A
6. C
判断
1. (4x+3y)2=16x2+9y2 ( )
2. (a-b)的平方等于(b-a)的平方. ( )
单选
4. 若(2a+3b)2=(2a-3b)2+( )成立, 则括号内的式子是 [ ]
A.6ab B.24ab C.12ab D.18ab
5. 若(x-y)2=0, 下面成立的等式是 [ ]
A.x2+y2=2xy B.x2+y2=-2xy C.x2+y2=0 D.2x2-y2=0
6. 下列等式成立的是 [ ]
A.(a-b)2=a2-ab+b2 B.(a+3b)2=a2+9b2
C.(a+b)(a-b)=(b+a)(-b+a) D. (x-9)(x+9)=x2-9
答案
1. ×
2. √
3. √
4. B
5. A
6. C
1. (4x+3y)2=16x2+9y2 ( )
2. (a-b)的平方等于(b-a)的平方. ( )
单选
4. 若(2a+3b)2=(2a-3b)2+( )成立, 则括号内的式子是 [ ]
A.6ab B.24ab C.12ab D.18ab
5. 若(x-y)2=0, 下面成立的等式是 [ ]
A.x2+y2=2xy B.x2+y2=-2xy C.x2+y2=0 D.2x2-y2=0
6. 下列等式成立的是 [ ]
A.(a-b)2=a2-ab+b2 B.(a+3b)2=a2+9b2
C.(a+b)(a-b)=(b+a)(-b+a) D. (x-9)(x+9)=x2-9
答案
1. ×
2. √
3. √
4. B
5. A
6. C
判断
1. (4x+3y)2=16x2+9y2 ( )
2. (a-b)的平方等于(b-a)的平方. ( )
单选
4. 若(2a+3b)2=(2a-3b)2+( )成立, 则括号内的式子是 [ ]
A.6ab B.24ab C.12ab D.18ab
5. 若(x-y)2=0, 下面成立的等式是 [ ]
A.x2+y2=2xy B.x2+y2=-2xy C.x2+y2=0 D.2x2-y2=0
6. 下列等式成立的是 [ ]
A.(a-b)2=a2-ab+b2 B.(a+3b)2=a2+9b2
C.(a+b)(a-b)=(b+a)(-b+a) D. (x-9)(x+9)=x2-9
答案
1. ×
2. √
3. √
4. B
5. A
6. C
一、
选择题
1、下列各式中从左到右的变形属于分解因式的是(
)
A
.a(a+b-1)=a2+ab-a
B.
a2
–a-2=a(a-1)-2
C
.-4
a2+9b2=(-2a+3b)(2a+3b)
D.
2x+1=x(2+1/x)
2、下列各式分解因是正确的是(
)
A
.x2y+7xy+y=y(x2+7x)
B.
3
a2b+3ab+6b=3b(a2+a+2)
C.
6xyz-8xy2=2xyz(3-4y)
D.
-4x+2y-6z=2(2x+y-3z)
3、下列多项式中,能用提公因式法分解因式的是(
)
A.
x2-y
B.
x2+2x
C.
x2+y2
D.x2-xy+y2
4、2(a-b)3-(b-
a)2分解因式的正确结果是(
)
A.
(a-b)2(2a-2b+1)
B.
2(a-b)(a-b-1)
C.
(b-a)2(2a-2b-1)
D.
(a-b)2(2a-b-1)
5、下列多项式分解因式正确的是(
)
A.
1+4a-4a2=(1-2a)2
B.
4-4a+a2=(a-2)2
C.
1+4x2=(1+2x)2
D.x2+xy+y2=(x+y)2
6、运用公式法计算992,应该是(
)
A.(100-1)2
B.(100+1)(100-1)
C.(99+1)(99-1)
D.
(99+1)2
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