数学人教版八年级上册专项练习

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幂的乘方专项练习题(有答案)知识点: 1.若m 、n 均为正整数,则(a m )n =_____,即幂的乘方,底数_____,指数_______.2.计算:(1)(75)4=_______; (2)75×74=_______;(3)(x 5)2=_______; (4)x 5·x 2=________;(5)[(-7)4] 5=_______; (6)[(-7)5] 4=________.3.你能说明下面每一步计算的理由吗?将它们填在括号里.(1)y ·(y 2)3=y ·y 6 ( )=y 7 ( )(2)2(a 2)6-(a 3)4=2a 12-a 12 ( )=a 12 ( )专项练习:(1)[(a+b )2] 4= (2)-(y 4)5=(3)(y 2a+1)2 (4)[(-5)3] 4-(54)3(5)(a -b )[(a -b )2] 5(6)(-a 2)5·a -a 11(7)(x 6)2+x 10·x 2+2[(-x )3] 4(8)(-x 5)2=_______,(-x 2)5=________,[(-x )2] 5=______.(9)(a 5)3 (10)(a n -2)3 (11)(43)3 (12)(-x 3)5 (13)[(-x )2] 3 (14)[(x -y )3]4 (15)______________)()(3224=-⋅a a(16)(16)____________)()(323=-⋅-a a ;(17)___________)()(4554=-+-x x ,(18)_______________)()(1231=⋅-++m m a a(19)___________________)()()()(322254222x x x x ⋅-⋅(20)若 3=n x , 则=n x3(21)x·(x 2)3 (22)(x m )n ·(x n )m(23)(y 4)5-(y 5)4(24)(m 3)4+m 10m 2+m·m 3·m 8(25)[(a -b )n ] 2 [(b -a )n -1] 2(26)若2k =83,则k=______.(27)(m 3)4+m 10m 2-m·m 3·m 8(28)5(a 3)4-13(a 6)2 =(29)7x 4·x 5·(-x )7+5(x 4)4-(x 8)2(30)[(x+y )3]6+[(x+y )9]2(31)[(b-3a )2]n+1·[(3a-b )2n+1]3(n 为正整数)(32)x 3·(x n )5=x 13,则n=_______.(33)(x 3)4+(x 4)3=________,(a 3)2·(a 2)3=_________.(34)若x m ·x 2m =2,求x9m (35)若a 2n =3,求(a 3n )4 (36)已知a m =2,a n =3,求a2m+3n (37)若644×83=2x ,求x 的值。

(38)若2×8n ×16n =222,求n 的值.(39)已知a 2m =2,b 3n =3,求(a 3m )2-(b 2n )3+a 2m ·b 3n 的值.(40)若2x =4y+1,27y =3x- 1,试求x 与y 的值. (41)已知:3x =2,求3x+2的值.(42) 已知x m+n ·xm -n =x 9,求m 的值. (43)若52x+1=125,求(x -2)2011+x 的值. (44)已知a m =3,a n =2,求a m+2n的值;(45)已知a 2n+1=5,求a 6n+3的值.(46)已知a=3555,b=4444,c=5333,试比较a ,b ,c 的大小.(47)当n 为奇数时,(-a 2)n ·(-a n )2=_________.(48)已知164=28m ,求m 的值。

(49)-{-[(-a 2)3] 4}2=_________.(50)已知n 为正整数,且x 2n =3,求9(x 3n )2的值.(51)若│a -2b │+(b -2)2=0,求a 5b 10的值.(52)已知3x+4y -5=0,求8x ×16y 的值.(53)若n 为自然数,试确定34n -1的末位数字.(54)比较550与2425的大小。

(55).灵活运用幂的乘方法则和同底数幂的乘法法则,以及数学中的整体思想,还可以解 决较复杂的问题,例如:已知a x =3,a y =2,求a x+y 的值.根据同底数幂乘法的逆运算,设a 2x+3y =a 2x ·a 3y ,然后利用幂的乘方的逆运算,得a 2x = (a x )2,a 3y =(a y )3,把a x =3,a y =2代入即可求得结果.所以a 2x+3y =a 2x ·a 3y =(a x )2·(a y )3=32·23=9×8=72.试一试完成以下问题:已知a m =2,a n =5,求a 3m+2n 的值.答案:知识点:1.a mn 不变 相乘 2.(1)720 (2)79 (3)x 10 (4)x 7 (5)720 (6)7203.(1)幂的乘方法则 同底数幂的乘法法则 (2)幂的乘方法则 合并同类项法则 专项练习答案:(1)(a+b )8 (2)-y 20(3)y 4a+2 (4)0 (5)(a -b )11(6)-2a 11 (7)4x 12(8)x 10 -x 10 x 10 提示:利用乘方的意义.(9)a 15 (10)a 3n -6 (11)49(12)-x 15 (13)x 6 (14)(x -y )12(15) -a 14 (16) -a 9 (17) 0(18)-a 5m 5+ (19) 3x 12-x 14 (20)=n x 3(x n )3=33= 27(21)x 7 (22)x mn 2 (23)0(24) 3m 12 (25)(a -b )2n 4- (26) K=9(27)m 12 (28) -8a 12 (29) -3x 16(30)2(x+y )18 (31)(3a-b )5n 8+(32) 2 提示:x 3·(x n )5=x 3·x 5n =x 3+5n =x 13,∴3+5n=13,n=2.(33)2x 12 a 12 提示:(x 3)4+(x 4)3=x 12+x 12=2x 12,(a 3)2·(a 2)3=a 6·a 6=a 6+6=a 12.(34) x m 3=2, x9m = (x m 3)3=23 =8 (35)(a 3n )4 =a 12n =(a 2n)6=36=729(36) a 2m+3n =a m 2a n 3=(a m )2(a n )3=22×33=108(37) 644×83=(26)4×(23)3=233 x=33 (38)2×23n ×24n =21n 7+, 7n+1=22 n=3 (39)(a 3m )2-(b 2n )3+a 2m ·b3n =(am 2)3-(b n 3)2+a 2m ·b 3n =23-32+2×3=5(40) 2x =22y 2+, 3y 3=3x- 1X=2y+2 3y=x+1 解得:x=4 y=1(42) 3x+2=3x 32 =2×9=18(42) m+n )+(m-n )=9M=4.5(43) 2x+1=3 x=1 (x -2)2011+x =(1-2)12011+=1(44)∵a m =3,a n =2.∴a m+2n =a m ·a 2n =a m ·(a n )2=3×22=12.(45)∵a 2n+1=5,∴a6n+3=a3(2n+1)=(a2n+1)3=53=125.(46)∵a=3555=35×111=(35)111=243111,b=4444=44×111=(44)111=256111.c=5333=53×111=(53)111=125111,又∵256>243>125,∴256111>243111>125111.即b>a>c.(47)-a4n提示:原式=(-a2n)·a2n=-a2n·a2n=-a4n.(48) 2 提示:∵164=(24)4=216=28m,∴8m=16,m=2.(49)-a48提示:原式=-{-[-(-a6)] 4}2=-{-[-a6] 4}2=-{-a24}2=-a48(50)∵x2n=3,∴9(x3n)2=9x6n=9·(x2n)3=9×33=32×33=35=243.(51)∵│a-2b│≥0,(b-2)2≥0,且│a-2b│+(b-2)2=0.∴│a-2b│=0,(b-2)2=0,∴20,4,20, 2.a b ab b-==⎧⎧∴⎨⎨-==⎩⎩∴a5b10=45×210=(22)5×210=210×210=220.(52) ∵3x+4y-5=0,∴3x+4y=5,∴8x·16y=(23)x×(24)y=23x×24y=23x+4y=25=32.(53)先探索3的幂的末位数规律: 31=3,32=9,33=27,34=81,35=243,36=729,37=2 187,38=6 561,…显示34n的末位数字为1,∴34n-1的末位数字为0. (54) 550=(52)25=2525∴550>2425(55)200。