搜狗做题网请教关于一道定积分的题目
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请教关于一道定积分的题目
(2/3)∫(1-x^2)的3/2次方dx,上限是1,下限是0.
请问怎么求?
谢谢
(2/3)∫(1-x^2)的3/2次方dx,上限是1,下限是0.
请问怎么求?
谢谢
设x=sin(a) a取值范围为[0,pi/2]
(2/3)∫(1-x^2)的3/2次方dx
=(2/3)∫cos^3(a)dsin(a)
=(2/3)∫cos^4(a)da
=(2/3)∫cos^4(a)da
=(2/3)∫[(1+cos2a)/2]^2da
=(2/3)∫(1+cos^2(2a)+2cos(2a))/4da
=(2/3)∫1/4da+(2/3)∫cos^2(2a)/4da+(2/3)∫cos(2a)/2da
=1/6+1/12∫[1+cos(4a)]da+1/3∫cos(2a)da
=1/6+1/12∫da+1/48∫cos(4a)]d4a+1/6∫cos(2a)d2a
=1/6+1/12+(1/48)sin4a|(0,pi/2)+1/6sin2a|(0,pi/2)
=1/6+1/12
=1/4
(2/3)∫(1-x^2)的3/2次方dx
=(2/3)∫cos^3(a)dsin(a)
=(2/3)∫cos^4(a)da
=(2/3)∫cos^4(a)da
=(2/3)∫[(1+cos2a)/2]^2da
=(2/3)∫(1+cos^2(2a)+2cos(2a))/4da
=(2/3)∫1/4da+(2/3)∫cos^2(2a)/4da+(2/3)∫cos(2a)/2da
=1/6+1/12∫[1+cos(4a)]da+1/3∫cos(2a)da
=1/6+1/12∫da+1/48∫cos(4a)]d4a+1/6∫cos(2a)d2a
=1/6+1/12+(1/48)sin4a|(0,pi/2)+1/6sin2a|(0,pi/2)
=1/6+1/12
=1/4