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月考名师检测卷(二)
1. C 2. C 3. B 4. D 5. A 6. A 7. B 8. C 9. C 10. C
11. 72 12. 30 13. 6 14. 50°或 130° 15. ①②③
16. 解:(1)原式 = 4x2 + 4x + 1 - (4x2 - 25) = 4x2 + 4x + 1 - 4x2 + 25 = 4x + 26.
(2)原式 = - 827a
6b3 19 a
2b4 34 a
3b2 = - 281a
11b9 .
17. 解:(1)原式 = (a2 + 1) 2 - (2a) 2 = (a2 + 1 + 2a)(a2 + 1 - 2a) = (a + 1) 2(a - 1) 2 .
(2)原式 = [3(a + b)] 2 - 2 × 3(a + b) × 2 + 22 = [3(a + b) - 2] 2 = (3a + 3b - 2) 2 .
18. 解:原式 = (2x3y2 - 2x2y - x2y + x3y2) ÷ 3x2y = (3x3 y2 - 3x2 y) ÷ 3x2 y = 3x3y2 ÷ 3x2y -
3x2y ÷ 3x2y = xy - 1.
当 x = 1ꎬy = - 1 时ꎬ原式 = 1 × ( - 1) - 1 = - 2.
19. 解:(1)①如图ꎬ射线 AD 即为所求.
②如图ꎬ直线 EF 即为所求.
(2)在△ABC 中ꎬ∵ ∠ABC = 60°ꎬ∠C = 40°ꎬ
∴ ∠BAC =180° -∠ABC -∠C =180° -60° -40° =80°.
∵ AD 平分∠BACꎬ∴ ∠EAB = 40°.
∵ EF 垂直平分线段 ABꎬ
∴ EA = EB. ∴ ∠EAB =∠EBA = 40°.
∴ ∠AEB = 180° -∠EAB -∠EBA = 180° - 40° - 40° = 100°.
20. 解:(1)∵ |a +3 | + (b -2)2 =0ꎬ∴ a +3 =0ꎬb -2 =0. ∴ a = -3ꎬb =2. ∴ ab = ( -3)2 =9.
(2)7ab - 3a - 7b - 2(2a + 3ab + 1) = 7ab - 3a - 7b - 4a - 6ab - 2 = ab - 7a - 7b - 2 =
ab - 7(a + b) - 2.
当 a + b = 6ꎬab = 3 时ꎬ原式 = 3 - 7 × 6 - 2 = - 41.
21. 证明:(1)如图ꎬ∵ ∠CAB +∠EAD = 90°.
∴ ∠1 +∠3 =∠2 +∠3 = 90°. ∴ ∠1 =∠2.
在△ADB 和△AEC 中ꎬ
AD = AEꎬ
∠1 =∠2ꎬ
AB = ACꎬ
{
∴ △ADB≌△AEC(SAS) . ∴ CE = BD.
(2)如图ꎬ延长 BD 交 CE 于点 H. ∵ △ADB≌△AECꎬ∴ ∠4 =∠5.
∵ ∠4 +∠6 +∠7 = 90°ꎬ∴ ∠6 +∠7 +∠5 = 90°. ∴ ∠BHC = 90°. ∴ BD⊥CE.
22. (1)解:∵ AC = BCꎬ∠A = 60°ꎬ
∴ △ABC 为等边三角形. ∴ AC = AB = 6.
又∵ BDꎬCE 分别是∠ABCꎬ∠ACB 的平分线ꎬ
∴ 点 DꎬE 分别是 ACꎬAB 的中点. 即 AD = 12 AC = 3ꎬAE =
1
2 AB = 3.
∴ AD = AE. ∴ △ADE 为等边三角形. ∴ DE = AE = 3.
(2)证明:如图ꎬ在 BC 上截取 BH = BE.
∵ BD 平分∠ABCꎬ∴ ∠ABD =∠CBD.
∵ BF = BFꎬ∴ △EBF≌△HBF(SAS) .
∴ ∠EFB =∠HFB.
∵ ∠A = 60°ꎬ∴ ∠ABC +∠ACB = 120°.
∵ CE 平分∠ACBꎬ∴ ∠ACE =∠BCE.
∴ ∠CBD +∠BCE = 12 (∠ABC +∠ACB) = 60°.
∴ ∠EFB =∠HFB = 60°. ∴ ∠CFH = 60°.
∴ ∠CFH =∠CFD = 60°.
∵ CF = CFꎬ∴ △CDF≌△CHF(ASA) . ∴ CD = CH.
∵ BH + CH = BCꎬ∴ BE + CD = BC.
23. 解:(1)(10 - 2t)
(2)存在. 分两种情况讨论:
①当 BP = CQꎬAB = PC 时ꎬ△ABP≌△PCQ.
∵ AB = 6 cmꎬ∴ PC = 6 cm. ∴ BP = 10 - 6 = 4(cm) . 即 2t = 4. 解得 t = 2.
∵ CQ = BP = 4 cm. ∴ v × 2