230问答网 > 不定积分求解:∫cos^6(x)dx

不定积分求解:∫cos^6(x)dx

请给具体步骤 谢谢不懂 能不能给详细的步骤~谢谢
2024-11-27 06:25:43
推荐回答(4个)
回答1:

如上图所示。

回答2:

简单分析一下,答案如图所示

回答3:

积分:cos^6(x)dx

cos^3(x)=(cos3x+3cosx)/4

所以:
积分:cos^6(x)dx
=积分:(cos3x+3cosx)^2/16dx
=1/16积分:(cos^2(3x)+6cosx*cos3x+9cos^2x)dx

积分:cos^2(3x)dx
=积分:1/2*(1+cos6x)dx
=1/2*(x+1/6sin6x)+C
(C是常数)

积分:cosxcos3xdx
=1/2积分:(cos4x+cos2x)dx
=1/2*(1/4sin4x+1/2sin2x)+C
(C是常数)

积分:cos^2xdx
=1/2积分:(1+cos2x)dx
=1/2*(x+1/2sin2x)+C
(C是常数)

所以原式
∫cos^6(x)dx
=1/16积分:(cos^2(3x)+6cosx*cos3x+9cos^2x)dx
=1/16[1/2*(x+1/6sin6x)+6*1/2*(1/4sin4x+1/2sin2x)+9*1/2*(x+1/2sin2x)]+C
=1/32*(10x+1/6*sin6x+3/2*sin4x+15/2sin2x)+C
(C是常数)

回答4:

1/6*cos(x)^5*sin(x)+5/24*cos(x)^3*sin(x)+5/16*cos(x)*sin(x)+5/16*x

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