内容正文:
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(2)当 a = 2ꎬb = 3 时ꎬ(x + a)(x + b) = (x + 2)(x + 3) = x2 + 3x + 2x + 6 = x2 + 5x + 6.
21. 解:(1)长方形的周长为 2(2x + 2y) = 4(x + y) .
∵ 两根同样长的铁丝ꎬ一根围成正方形ꎬ另一根围成长为 2xꎬ宽为 2y 的长方形ꎬ
∴ 正方形的边长为 4(x + y) ÷ 4 = x + yꎬ∴ 正方形与长方形的面积之差为(x + y) 2 -
2x2y = x2 + 2xy + y2 - 4xy = x2 - 2xy + y2 = (x - y) 2 .
(2)∵ x≠yꎬ∴ (x - y) 2 > 0ꎬ∴ 正方形的面积大于长方形的面积.
22. 解:(1)4x2 - 5x + 1 = (4x - 1)(x - 1) .
(2)x3 - x2 - x + 1 = (x3 - x2) - (x - 1) = x2 (x - 1) - (x - 1) = (x - 1) ( x2 - 1) =
(x - 1) 2(x + 1) .
23. 解:(1)B
(2)∵ x2 - 9y2 = (x + 3y)(x - 3y) = 12ꎬ且 x + 3y = 4ꎬ∴ x - 3y = 3.
(3)(1 - 1
22
) × (1 - 1
32
) × (1 - 1
42
) × × (1 - 1
2 0202
) × (1 - 1
2 0212
) = (1 + 12 ) ×
(1 - 12 ) × (1 +
1
3 ) × (1 -
1
3 ) × × (1 +
1
2 021) × (1 -
1
2 021) =
3
2 ×
1
2 ×
4
3 ×
2
3 ×
5
4 ×
3
4 × ×
2 022
2 021 ×
2 020
2 021 =
1
2 ×
2 022
2 021 =
1 011
2 021.
月考名师检测卷(一)
1. B 2. C 3. B 4. D 5. D 6. B 7. C 8. B 9. D 10. B
11. 2 12. x = 5 13. 2 14. - 64 15. ± 45
16. 解:(1)原式 = 1 - 14 × (1 - 25) + 3 = 1 + 6 + 3 = 10.
(2)原式 = ( - x) 12 ÷ x6 + x6 = - x6 + x6 = 0.
17. 解:(1)原式 = 12 (m
2 - 2mn + n2) = 12 (m - n)
2 .
(2)原式 = [3y + (2x + y)][3y - (2x + y)] = (2x +4y)(2y -2x) =4(x +2y)(y - x) .
18. 解:[4(x - y)2 -2(x -2y)(y +2x)] ÷ ( -2y) = [4(x2 - 2xy + y2) - 2(xy + 2x2 - 2y2 -
4xy)] ÷ ( - 2y) = (4x2 - 8xy + 4y2 + 6xy - 4x2 + 4y2 ) ÷ ( - 2y) = ( - 2xy + 8y2 ) ÷
( - 2y) = x - 4y. 当 x = 2ꎬy = - 1 时ꎬ原式 = 2 - 4 × ( - 1) = 2 + 4 = 6.
19. 解:∵ 2a - 1 的平方根是 ± 3ꎬ∴ 2a - 1 = 9 ꎬ∴ a = 5 ꎬ∵ b - 1 的立方根是 2ꎬ
∴ b - 1 = 8ꎬ∴ b = 9ꎬ∴ a - b = 5 - 9 = - 4.
20. 解:【发现】(1)625
(2)a + b = 50
【类比】900
证明:由题意可得ꎬm + n = 60ꎬ将 n = 60 - m 代入 mnꎬ得 mn = m(60 - m) = - m2 +
60m = - (m - 30) 2 + 900ꎬ∵ (m - 30) 2≥0ꎬ∴ - (m - 30) 2≤0ꎬ∴ 当 - (m - 30) 2 =
0ꎬ即 m = 30 时ꎬmn 的最大值为 900.
21. 解:(1)∵ 2 ÷ 8x × 16x = 2 ÷ (23) x × (24) x = 2 ÷ 23x × 24x = 21 - 3x + 4x = 25ꎬ
∴ 1 - 3x + 4x = 5ꎬ解得 x = 4.
(2)∵ 2x + 2 + 2x + 1 = 24ꎬ∴ 2x × (22 + 2) = 2x × 6 = 24ꎬ∴ 2x = 4 = 22ꎬ∴ x = 2.
(3)∵ x = 5m - 3ꎬ∴ 5m = x + 3ꎬ∴ y = 4 - 25m = 4 - (52) m = 4 - (