分数指数幂练习
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分数指数幂1.下列命题中,正确命题的个数是__________.①na n=a②若a∈R,则(a2-a+1)0=1③3x4+y3=x43+y④3-5=6-522.下列根式、分数指数幂的互化中,正确的序号是__________.①-x=(-x)12(x≠0)②x x=x34③x-13=-3x④3x·4x=x112⑤(xy)-34=4yx 3(xy≠0)⑥6y2=y13(y<0)3.若a=2,b=3,c=-2,则(a c)b=__________. 4.根式a a的分数指数幂形式为__________.5.4-252=__________.6.2-(2k+1)-2-(2k-1)+2-2k的化简结果是__________.7.(1)设α,β是方程2x2+3x+1=0的两个根,则(14)α+β=__________.(2)若10x=3,10y=4,则10x-12y=__________.8.(1)求下列各式的值:①2723;②(614)12;③(49)-32.(2)解方程:①x-3=18;②x=914.9.求下列各式的值:(1)(0.027)23+(12527)13-(279)0.5;(2)(13)12+3·(3-2)-1-(11764)14-(333)34-(13)-1.10.已知a 12+a -12=4,求a +a -1的值.11.化简下列各式:(1)5x -23y12-14x -1y 12-56x 13y -16;(2)m +m -1+2m -12+m12.12.[(-2)2]-12的值是__________.13.化简(36a 9)4·(63a 9)4的结果是__________.14.以下各式,化简正确的个数是__________.①a 25a -13a -115=1②(a 6b -9)-23=a -4b6③(-x 14y -13)(x -12y 23)(-x 14y 23)=y④-15a 12b 13c -3425a -12b 13c54=-35ac15.(2010山东德州模拟,4改编)如果a 3=3,a 10=384,则a 3[(a 10a 3)17]n等于__________.16.化简3a -b 3+a -2b 2的结果是__________.17.下列结论中,正确的序号是__________.①当a<0时,(a 2)32=a3②na n =|a|(n>1且n ∈N *)③函数y =(x -2)12-(3x -7)0的定义域是(2,+∞)④若100a =5,10b=2,则2a +b =1 18.(1)若a =(2+3)-1,b =(2-3)-1,则(a +1)-2+(b +1)-2的值是__________.(2)若x >0,y >0,且x(x +y)=3y(x +5y),则2x +2xy +3y x -xy +y的值是__________.19.已知a =2 0091n -2 009-1n 2(n ∈N *),则(a 2+1+a)n的值是__________.20.若S =(1+2-132)(1+2-116)(1+2-18)(1+2-14)(1+2-12),那么S 等于__________.21.先化简,再求值:(1)a 2·5a310a 7·a ,其中a =8-53;(2)a 3x+a -3xa x+a-x ,其中a 2x=5. 22.(易错题)计算:(1)(235)0+2-2·(214)-12-(0.01)0.5;(2)(279)0.5+0.1-2+(21027)-23-3π0+3748;(3)(0.008 1)-14-[3×(78)0]-1×[81-0.25+(338)-13]-12-10×0.02713. 23.已知x 12+x -12=3,求x 32+x -32+2x 2+x -2+3的值.24.化简下列各式:(1)x-2+y-2x -23+y -23-x-2-y-2x -23-y -23;(2)a43-8a13ba23+23ab+4b23÷(1-23ba)×3a.答案与解析基础巩固1.1∵na n=a,当n为奇数时,|a|,当n为偶数时,∴①不正确;∵a∈R,且a2-a+1=(a-12)2+34≠0,∴②正确;∵x4+y3为多项式,∴③不正确;④中左边为负,右边为正显然不正确.∴只有②正确.2.②⑤①-x=-x 12,∴①错;②x x=(x x)12=(x·x12)12=(x32)12=x34,∴②对;③x-13=1x13=13x,∴③错;④3x·4x=x13·x14=x13+14=x712,∴④错;⑤(xy)-34=(yx)34=4yx3,∴⑤对;⑥6y 2=|y|13=-y 13(y<0),∴⑥错.∴②⑤正确.3.164(a c )b =a bc =23×(-2)=2-6=126=164.4.a32a a =a ·a 12=a1+12=a 32.5.54-252=4252=454=5.6.-2-(2k +1)∵2-(2k +1)-2-(2k -1)+2-2k=2-2k·2-1-2-2k·21+2-2k=(12-2+1)·2-2k =-12·2-2k=-2-(2k +1).7.(1)8(2)32(1)由根与系数的关系,得α+β=-32,∴(14)α+β=(14)-32=(2-2)-32=23=8.(2)∵10x=3,10y =4,∴10x -12y =10x ÷1012y =10x ÷(10y )12=3÷412=32. 8.解:(1)①2723=(33)23=33×23=32=9. ②(614)12=(254)12=[(52)2]12=(52)2×12=52.③(49)-32=(23)2×(-32)=(23)-3=(32)3=278.(2)①∵x-3=18=2-3,∴x =2. ②∵x =914,∴(x)2=(914)2=912.∴x =(32)12=3.9.解:(1)原式=(0.33)23+(12527)13-(259)12=9100+53-53=9100.(2)原式=3-12+33-2-(8164)14-(3-23)34-31=33+3(3+2)-[4(34)4]14-3-12-3=33+3+6-2·34-33-3 =6-342.10.解:∵a 12+a -12=4.∴两边平方,得a +a -1+2=16.∴a +a -1=14.11.解:(1)原式=245×5×x -23+1-13×y 12-12+16=24x 0y 16=24y 16;(2)原式=m 122+2m 12·m -12+m -122m -12+m 12=m 12+m -122m 12+m -12=m 12+m -12.能力提升12.22原式=2-12=12=22.13.a 4原式=(3a 96)4·(6a 93)4=(a 32×13)4·(a3×16)4=(a 12)4·(a 12)4=a 2·a 2=a 4.14.3由分数指数幂的运算法则知①②③正确;对④,∵左边=-35a 12+12b 13-13c -34-54=-35a 1b 0c -2=-35ac -2≠右边,∴④错误.15.3·2n原式=3·[(3843)17]n =3·[(128)17]n =3·(27×17)n =3·2n . 16.b 或2a -3b 原式=a -b +|a -2b|=a -b +2b -a ,a <2ba -b +a -2b ,a ≥2b=b ,a <2b ,2a -3b ,a ≥2b.17.④①中,当a <0时,(a 2)32=[(a 2)12]3=(|a|)3=(-a)3=-a 3,∴①不正确;当a <0,n 为奇数时,n a n=a ,∴②不正确;③中,有x -2≥0,3x -7≠0,即x≥2且x≠7 3,故定义域为[2,73)∪(73,+∞),∴③不正确;④中,∵100a=5,10b=2,∴102a=5,10b=2,102a×10b=10. ∴2a+b=1.∴④正确.18.(1)23(2)3(1)a=12+3=2-3,b=12-3=2+3,∴(a+1)-2+(b+1)-2=(3-3)-2+(3+3)-2=13-32+13+32=3+32+3-323-32·3+32=32+2·3·3+3+32-2·3·3+3 [3-33+3]2=2×9+69-32=2436=23.(2)由已知条件,可得(x)2-2xy-15(y)2=0,∴x+3y=0或x-5y=0. ∵x>0,y>0,∴x=5y,x=25y.∴原式=50y+225y2+3y 25y-25y2+y=50y+10y+3y25y-5y+y=63y21y=3.19.2 009∵a=2 0091n-2 009-1n2,∴a2+1=1+2 0092n+2 009-2n-24=2 0091n2+2+ 2 009-1n24=(2 0091n+2 009-1n2)2.∴a2+1+a=2 0091n+2 009-1n2+2 0091n-2 009-1n2=2 0091 n .∴(a 2+1+a)n=(2 0091n )n =2 009.20.12(1-2-132)-1原式=1-2-1321+2-1321+2-1161+2-181+2-141+2-121-2-132=1-2-1161+2-1161+2-181+2-141+2-121-2-132=1-2-181+2-181+2-141+2-121-2-132=1-2-141+2-141+2-121-2-132=1-2-121+2-121-2-132=1-2-11-2-132=12(1-2-132)-1. 21.解:(1)原式=a2+35-710-12=a 75=(8-53)75=8-73=(23)-73=2-7=1128.(2)原式=ax 3+a-x3a x+a-x =a x+a-xa 2x-a x·a -x +a-2xax +a -x =a 2x-1+a-2x=5-1+15=415.22.解:(1)原式=1+14·(49)12-(1100)12=1+14×23-(110)2×12=1+16-110=1115.(2)原式=(259)12+(110)-2+(6427)-23-3×1+3748=53+100+(43)-2-3+3748=53+100+916-3+3748=100.(3)原式=[(0.3)4]-14-3-1×[(34)-14+(278)-13]-12-10×[(0.3)3]13=0.3-1-13[3-1+(32)-1]-12-10×0.3=103-13(13+23)-12-3=103-13-3=0.23.解:∵x 12+x-12=3,∴(x 12+x-12)2=9.∴x+x-1=7.∴原式=x123+x-123+2 x2+x-2+3=x12+x-12x-1+x-1+2 x+x-12-2+3=3×7-1+272-2+3=25.拓展探究24.解:(1)原式=x-233+y-233x-23+y-23-x-233-y-233x-23-y-23=(x-23)2-x-23·y-23+(y-23)2-(x-23)2-x-23·y-23-(y-23)2=-2(xy)-23.(2)原式=a13[a133-2b133]a23+2a13b13+2b132÷(1-2b13a13)×a13=a13a13-2b13[a23+2a13b13+2b132]a23+2a13b13+2b132÷a13-2b13a13×a13=a13a13-2b13·11×a13a13-2b13×a13=a13·a13·a13=a.。