麻烦找下初二下期数学的计算题(内容为因式分解和分式的加减乘除法)谢了~
\u6c42\u521d\u4e8c\u56e0\u5f0f\u5206\u89e3\u7684\u8ba1\u7b97\u98981- 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
\u53c2\u8003\u8d44\u6599\uff1a\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\u3001\u8fd0\u900129.5\u5428\u7164\uff0c\u5148\u7528\u4e00\u8f86\u8f7d\u91cd4\u5428\u7684\u6c7d\u8f66\u8fd03\u6b21\uff0c\u5269\u4e0b\u7684\u7528\u4e00\u8f86\u8f7d\u91cd\u4e3a2.5\u5428\u7684\u8d27\u8f66\u8fd0\u3002\u8fd8\u8981\u8fd0\u51e0\u6b21\u624d\u80fd\u5b8c\uff1f
\u8fd8\u8981\u8fd0x\u6b21\u624d\u80fd\u5b8c
29.5-3*4=2.5x
17.5=2.5x
x=7
\u8fd8\u8981\u8fd07\u6b21\u624d\u80fd\u5b8c
2\u3001\u4e00\u5757\u68af\u5f62\u7530\u7684\u9762\u79ef\u662f90\u5e73\u65b9\u7c73\uff0c\u4e0a\u5e95\u662f7\u7c73\uff0c\u4e0b\u5e95\u662f11\u7c73\uff0c\u5b83\u7684\u9ad8\u662f\u51e0\u7c73\uff1f
\u5b83\u7684\u9ad8\u662fx\u7c73
x(7+11)=90*2
18x=180
x=10
\u5b83\u7684\u9ad8\u662f10\u7c73
3\u3001\u67d0\u8f66\u95f4\u8ba1\u5212\u56db\u6708\u4efd\u751f\u4ea7\u96f6\u4ef65480\u4e2a\u3002\u5df2\u751f\u4ea7\u4e869\u5929\uff0c\u518d\u751f\u4ea7908\u4e2a\u5c31\u80fd\u5b8c\u6210\u751f\u4ea7\u8ba1\u5212\uff0c\u8fd99\u5929\u4e2d\u5e73\u5747\u6bcf\u5929\u751f\u4ea7\u591a\u5c11\u4e2a\uff1f
\u8fd99\u5929\u4e2d\u5e73\u5747\u6bcf\u5929\u751f\u4ea7x\u4e2a
9x+908=5408
9x=4500
x=500
\u8fd99\u5929\u4e2d\u5e73\u5747\u6bcf\u5929\u751f\u4ea7500\u4e2a
4\u3001\u7532\u4e59\u4e24\u8f66\u4ece\u76f8\u8ddd272\u5343\u7c73\u7684\u4e24\u5730\u540c\u65f6\u76f8\u5411\u800c\u884c\uff0c3\u5c0f\u65f6\u540e\u4e24\u8f66\u8fd8\u76f8\u969417\u5343\u7c73\u3002\u7532\u6bcf\u5c0f\u65f6\u884c45\u5343\u7c73\uff0c\u4e59\u6bcf\u5c0f\u65f6\u884c\u591a\u5c11\u5343\u7c73\uff1f
\u4e59\u6bcf\u5c0f\u65f6\u884cx\u5343\u7c73
3(45+x)+17=272
3(45+x)=255
45+x=85
x=40
\u4e59\u6bcf\u5c0f\u65f6\u884c40\u5343\u7c73
5\u3001\u67d0\u6821\u516d\u5e74\u7ea7\u6709\u4e24\u4e2a\u73ed\uff0c\u4e0a\u5b66\u671f\u7ea7\u6570\u5b66\u5e73\u5747\u6210\u7ee9\u662f85\u5206\u3002\u5df2\u77e5\u516d\uff081\uff09\u73ed40\u4eba\uff0c\u5e73\u5747\u6210\u7ee9\u4e3a87.1\u5206\uff1b\u516d\uff082\uff09\u73ed\u670942\u4eba\uff0c\u5e73\u5747\u6210\u7ee9\u662f\u591a\u5c11\u5206\uff1f
\u5e73\u5747\u6210\u7ee9\u662fx\u5206
40*87.1+42x=85*82
3484+42x=6970
42x=3486
x=83
\u5e73\u5747\u6210\u7ee9\u662f83\u5206
6\u3001\u5b66\u6821\u4e70\u676510\u7bb1\u7c89\u7b14\uff0c\u7528\u53bb250\u76d2\u540e\uff0c\u8fd8\u5269\u4e0b550\u76d2\uff0c\u5e73\u5747\u6bcf\u7bb1\u591a\u5c11\u76d2\uff1f
\u5e73\u5747\u6bcf\u7bb1x\u76d2
10x=250+550
10x=800
x=80
\u5e73\u5747\u6bcf\u7bb180\u76d2
7\u3001\u56db\u5e74\u7ea7\u5171\u6709\u5b66\u751f200\u4eba\uff0c\u8bfe\u5916\u6d3b\u52a8\u65f6\uff0c80\u540d\u5973\u751f\u90fd\u53bb\u8df3\u7ef3\u3002\u7537\u751f\u5206\u62105\u7ec4\u53bb\u8e22\u8db3\u7403\uff0c\u5e73\u5747\u6bcf\u7ec4\u591a\u5c11\u4eba\uff1f
\u5e73\u5747\u6bcf\u7ec4x\u4eba
5x+80=200
5x=160
x=32
\u5e73\u5747\u6bcf\u7ec432\u4eba
8\u3001\u98df\u5802\u8fd0\u6765150\u5343\u514b\u5927\u7c73\uff0c\u6bd4\u8fd0\u6765\u7684\u9762\u7c89\u76843\u500d\u5c1130\u5343\u514b\u3002\u98df\u5802\u8fd0\u6765\u9762\u7c89\u591a\u5c11\u5343\u514b\uff1f
\u98df\u5802\u8fd0\u6765\u9762\u7c89x\u5343\u514b
3x-30=150
3x=180
x=60
\u98df\u5802\u8fd0\u6765\u9762\u7c8960\u5343\u514b
9\u3001\u679c\u56ed\u91cc\u670952\u68f5\u6843\u6811\uff0c\u67096\u884c\u68a8\u6811\uff0c\u68a8\u6811\u6bd4\u6843\u6811\u591a20\u68f5\u3002\u5e73\u5747\u6bcf\u884c\u68a8\u6811\u6709\u591a\u5c11\u68f5\uff1f
\u5e73\u5747\u6bcf\u884c\u68a8\u6811\u6709x\u68f5
6x-52=20
6x=72
x=12
\u5e73\u5747\u6bcf\u884c\u68a8\u6811\u670912\u68f5
10\u3001\u4e00\u5757\u4e09\u89d2\u5f62\u5730\u7684\u9762\u79ef\u662f840\u5e73\u65b9\u7c73\uff0c\u5e95\u662f140\u7c73\uff0c\u9ad8\u662f\u591a\u5c11\u7c73\uff1f
\u9ad8\u662fx\u7c73
140x=840*2
140x=1680
x=12
\u9ad8\u662f12\u7c73
11\u3001\u674e\u5e08\u5085\u4e70\u676572\u7c73\u5e03\uff0c\u6b63\u597d\u505a20\u4ef6\u5927\u4eba\u8863\u670d\u548c16\u4ef6\u513f\u7ae5\u8863\u670d\u3002\u6bcf\u4ef6\u5927\u4eba\u8863\u670d\u75282.4\u7c73\uff0c\u6bcf\u4ef6\u513f\u7ae5\u8863\u670d\u7528\u5e03\u591a\u5c11\u7c73\uff1f
\u6bcf\u4ef6\u513f\u7ae5\u8863\u670d\u7528\u5e03x\u7c73
16x+20*2.4=72
16x=72-48
16x=24
x=1.5
\u6bcf\u4ef6\u513f\u7ae5\u8863\u670d\u7528\u5e031.5\u7c73
12\u30013\u5e74\u524d\u6bcd\u4eb2\u5c81\u6570\u662f\u5973\u513f\u76846\u500d\uff0c\u4eca\u5e74\u6bcd\u4eb233\u5c81\uff0c\u5973\u513f\u4eca\u5e74\u51e0\u5c81\uff1f
\u5973\u513f\u4eca\u5e74x\u5c81
30=6(x-3)
6x-18=30
6x=48
x=8
\u5973\u513f\u4eca\u5e748\u5c81
13\u3001\u4e00\u8f86\u65f6\u901f\u662f50\u5343\u7c73\u7684\u6c7d\u8f66\uff0c\u9700\u8981\u591a\u5c11\u65f6\u95f4\u624d\u80fd\u8ffd\u4e0a2\u5c0f\u65f6\u524d\u5f00\u51fa\u7684\u4e00\u8f86\u65f6\u901f\u4e3a40\u5343\u7c73\u6c7d\u8f66\uff1f
\u9700\u8981x\u65f6\u95f4
50x=40x+80
10x=80
x=8
\u9700\u89818\u65f6\u95f4
14\u3001\u5c0f\u4e1c\u5230\u6c34\u679c\u5e97\u4e70\u4e863\u5343\u514b\u7684\u82f9\u679c\u548c2\u5343\u514b\u7684\u68a8\u5171\u4ed815\u5143\uff0c1\u5343\u514b\u82f9\u679c\u6bd41\u5343\u514b\u68a8\u8d350.5\u5143\uff0c\u82f9\u679c\u548c\u68a8\u6bcf\u5343\u514b\u5404\u591a\u5c11\u5143\uff1f
\u82f9\u679cx
3x+2(x-0.5)=15
5x=16
x=3.2
\u82f9\u679c:3.2
\u68a8:2.7
15\u3001\u7532\u3001\u4e59\u4e24\u8f66\u5206\u522b\u4eceA\u3001B\u4e24\u5730\u540c\u65f6\u51fa\u53d1\uff0c\u76f8\u5411\u800c\u884c\uff0c\u7532\u6bcf\u5c0f\u65f6\u884c50\u5343\u7c73\uff0c\u4e59\u6bcf\u5c0f\u65f6\u884c40\u5343\u7c73\uff0c\u7532\u6bd4\u4e59\u65e91\u5c0f\u65f6\u5230\u8fbe\u4e2d\u70b9\u3002\u7532\u51e0\u5c0f\u65f6\u5230\u8fbe\u4e2d\u70b9\uff1f
\u7532x\u5c0f\u65f6\u5230\u8fbe\u4e2d\u70b9
50x=40(x+1)
10x=40
x=4
\u75324\u5c0f\u65f6\u5230\u8fbe\u4e2d\u70b9
16\u3001\u7532\u3001\u4e59\u4e24\u4eba\u5206\u522b\u4eceA\u3001B\u4e24\u5730\u540c\u65f6\u51fa\u53d1\uff0c\u76f8\u5411\u800c\u884c\uff0c2\u5c0f\u65f6\u76f8\u9047\u3002\u5982\u679c\u7532\u4eceA\u5730\uff0c\u4e59\u4eceB\u5730\u540c\u65f6\u51fa\u53d1\uff0c\u540c\u5411\u800c\u884c\uff0c\u90a3\u4e484\u5c0f\u65f6\u540e\u7532\u8ffd\u4e0a\u4e59\u3002\u5df2\u77e5\u7532\u901f\u5ea6\u662f15\u5343\u7c73/\u65f6\uff0c\u6c42\u4e59\u7684\u901f\u5ea6\u3002
\u4e59\u7684\u901f\u5ea6x
2(x+15)+4x=60
2x+30+4x=60
6x=30
x=5
\u4e59\u7684\u901f\u5ea65
17\uff0e\u4e24\u6839\u540c\u6837\u957f\u7684\u7ef3\u5b50\uff0c\u7b2c\u4e00\u6839\u526a\u53bb15\u7c73\uff0c\u7b2c\u4e8c\u6839\u6bd4\u7b2c\u4e00\u6839\u5269\u4e0b\u76843\u500d\u8fd8\u591a3\u7c73\u3002\u95ee\u539f\u6765\u4e24\u6839\u7ef3\u5b50\u5404\u957f\u51e0\u7c73\uff1f
\u539f\u6765\u4e24\u6839\u7ef3\u5b50\u5404\u957fx\u7c73
3(x-15)+3=x
3x-45+3=x
2x=42
x=21
\u539f\u6765\u4e24\u6839\u7ef3\u5b50\u5404\u957f21\u7c73
18\uff0e\u67d0\u6821\u4e70\u67657\u53ea\u7bee\u7403\u548c10\u53ea\u8db3\u7403\u5171\u4ed8248\u5143\u3002\u5df2\u77e5\u6bcf\u53ea\u7bee\u7403\u4e0e\u4e09\u53ea\u8db3\u7403\u4ef7\u94b1\u76f8\u7b49\uff0c\u95ee\u6bcf\u53ea\u7bee\u7403\u548c\u8db3\u7403\u5404\u591a\u5c11\u5143\uff1f
\u6bcf\u53ea\u7bee\u7403x
7x+10x/3=248
21x+10x=744
31x=744
x=24
\u6bcf\u53ea\u7bee\u7403:24
\u6bcf\u53ea\u8db3\u7403:8
1.提取公因式
12x平方-12x平方y-3x平方y平方
2.平方差公式
3ax四次方-3ay四次方
3.完全平方公式
25m平方+64-80m
4.分组分解
3xy-2x-12y+8
5.十字相乘法
x四次方-7x平方y平方+6y四次方
分式:
加减 5x/(x+y)+y/(x+y)
乘除 b/(a平方-9)*(a+3)/(b平方-b)
混合 大括号a/(a-b)+b/(b-a)大括号*ab/(a-b)
因式分解知识点
多项式的因式分解,就是把一个多项式化为几个整式的积.分解因式要进行到每一个因式都不能再分解为止.分解因式的常用方法有:
(1)提公因式法
如多项式 ,
其中m叫做这个多项式各项的公因式, m既可以是一个单项式,也可以是一个多项式.
(2)运用公式法,即用
,
,
,
(3)十字相乘法
对于二次项系数为l的二次三项式 寻找满足ab=q,a+b=p的a,b,如有,则对于一般的二次三项式寻找满足
a1a2=a,c1c2=c,a1c2+a2c1=b的a1,a2,c1,c2,如有,则
(4)分组分解法:把各项适当分组,先使分解因式能分组进行,再使分解因式在各组之间进行.
分组时要用到添括号:括号前面是“+”号,括到括号里的各项都不变符号;括号前面是“-”号,括到括号里的各项都改变符号.
1.下列各式从左到右的变形是因式分解的是 ( )
A. B.
C. D.
2.用提公因式法分解因式时,从多项式中提出的公因式是 ;
3.分解因式时,提出的公因式应当为 ( )
A. B. C. D.
4.若是完全平方式,则的值是 ( )
A.3 B. C.6 D.
5.等于 ( )
A. B. C. D.
6.下列多项式中,
⑸ ,在有理数范围内能用平方差公式分解因式的有( )
A.2个 B.3个 C.4个 D.5个
绛旓細(1) 66x+17y=3967 25x+y=1200 绛旀锛歺=48 y=47 (2) 18x+23y=2303 74x-y=1998 绛旀锛歺=27 y=79 (3) 44x+90y=7796 44x+y=3476 绛旀锛歺=79 y=48 (4) 76x-66y=4082 30x-y=2940 绛旀锛歺=98 y=51 (5) 67x+54y=8546 71x-y=5680 绛旀锛歺=80 y=59 (6) 42x-95y...
绛旓細鍥炵瓟锛(1)5/4ab (2) 0 (3)x=4
绛旓細鍥犲紡鍒嗚В锛1.鎻愬彇鍏洜寮 12x骞虫柟-12x骞虫柟y-3x骞虫柟y骞虫柟 2.骞虫柟宸叕寮 3ax鍥涙鏂-3ay鍥涙鏂 3.瀹屽叏骞虫柟鍏紡 25m骞虫柟+64-80m 4.鍒嗙粍鍒嗚В 3xy-2x-12y+8 5.鍗佸瓧鐩镐箻娉 x鍥涙鏂-7x骞虫柟y骞虫柟+6y鍥涙鏂 鍒嗗紡锛氬姞鍑 5x/锛坸+y锛+y/(x+y)涔橀櫎 b/锛坅骞虫柟-9锛*锛坅+3锛/锛坆骞虫柟-b锛夋贩鍚...
绛旓細1锛庡垎瑙e洜寮忥細(x2+3x)2-2(x2+3x)锛8锛 锛2锛庡垎瑙e洜寮忥細(x2+x+1)(x2+x+2)锛12= 锛3锛庡垎瑙e洜寮忥細x2锛峹y锛2y2锛峹锛峺= 锛 (閲嶅簡甯備腑鑰冮)4锛庡凡鐭ヤ簩娆′笁椤瑰紡 鍦ㄦ暣鏁拌寖鍥村唴鍙互鍒嗚В涓轰袱涓竴娆″洜寮忕殑绉紝鍒欐暣鏁癿鐨勫彲鑳藉彇鍊间负 锛5锛庡皢澶氶」寮 鍒嗚В鍥犲紡锛岀粨鏋滄纭殑鏄紙 锛夛紟A锛 B...
绛旓細x*y*4=1536 x=32 y=12 鍒欓暱涓 32+4+4锛40 锛屽涓 20 2銆侊紙1锛夊洜涓哄埄娑︽槸閿鍞敹鍏ョ殑20%锛屾墍浠ョ涓夊ぉ鐨勯攢鍞敹鍏ヤ负1.25/锛0.2锛=6.25涓囧厓 锛2锛夎骞冲潎澧為暱鐜囦负x锛屽垯4x2=6.25锛屾墍浠=1.25銆傚嵆骞冲潎澧為暱鐜囦负25 3銆亁²+kx-6=0鐨勪竴涓牴鏄2锛屽垯鏈2^2+2k=6 鍒檏锛1锛...
绛旓細1銆佽В锛氳鏈墄浣嶉夋墜 x锛坸-1)/2=28 瑙e緱x=8 绛旓細鏈8浣嶉夋墜 2銆佹牴鎹笅鍨傞暱搴︾浉鍚岋紝鍙煡鍙板竷鐨勯暱涔熸瘮瀹藉3灏 璁惧彴甯冪殑瀹戒负x灏猴紝鍒欓暱涓猴紙x+3锛夊昂 x锛坸+3锛=2*6*3 x^2+3x=36 x^2+3x-36=0 瑙e緱锛歺绾=4.7 鎵浠+3=7.7 绛旓細鍙板竷闀夸负7.7灏猴紝瀹戒负4.7灏 3銆佽鎺掓垚姝...
绛旓細(涓)璁$畻棰: (1)23+(-73) (2)(-84)+(-49) (3)7+(-2.04) (4)4.23+(-7.57) (5)(-7/3)+(-7/6) (6)9/4+(-3/2) (7)3.75+(2.25)+5/4 (8)-3.75+(+5/4)+(-1.5) 5. x^2(y+z)^2-2xy(x-z)(y+z)+y^2(x-z)^2 =[x(y+z)-y(x-z)]^2 =(xz+yz)^2 =z^2...
绛旓細1.鍘熷紡锛4a^2b/3cd^2*5c^2d/4ab^2*3d/2abc =5/2b^2 2.鍘熷紡=-(a+9)(a-9)/(a+3)^2*2(a+3)/(a-9)*(a+3)/(a+9)=-2
绛旓細鍥炵瓟锛氫綘濂 澶у鐞嗙鐙椾负鎮ㄨВ绛斻1)杩囩▼鐣 鍙渶鎶婂墠鑰呬箻浠ュ悗闈 鐨勫掓暟鍗冲彲銆傜害鍒嗗緱5mx/4ny 2)x²(x-y)-y²(y-x)+2xy(x-y)=(x-y)(x²+y²)+2xy(x-y)=(x-y)(x²+y²+2xy)=(x-y)(x+y)²
绛旓細鍒濅簩鏁板鍒嗗紡娴嬭瘯棰 涓銆佽В涓嬪垪鍒嗗紡鏂圭▼锛1銆2銆佷簩銆佸厛鍖栫畝,鍐嶆眰鍊硷細涓夈佸垪鍒嗗紡鏂圭▼瑙e簲鐢ㄩ锛1.鐢层佷箼涓ょ粍瀛︾敓鍘昏窛瀛︽牎4.5鍗冪背鐨勬暚鑰侀櫌鎵撴壂鍗敓,鐢茬粍瀛︾敓姝ヨ鍑哄彂鍗婂皬鏃跺悗,涔欑粍瀛︾敓楠戣嚜琛岃溅寮濮嬪嚭鍙,缁撴灉涓ょ粍瀛︾敓鍚屾椂鍒拌揪鏁侀櫌,濡傛灉姝ヨ鐨勯熷害鏄獞鑷杞︾殑閫熷害鐨 ,姹傛琛屽拰楠戣嚜琛岃溅鐨勯熷害鍚勬槸澶氬皯?
