数学(sinx)^2-(cosx)^2/(sinx)^4+(cosx)^4的积分
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数学(sinx)^2-(cosx)^2/(sinx)^4+(cosx)^4的积分
数学(sinx)^2-(cosx)^2/(sinx)^4+(cosx)^4的积分
数学(sinx)^2-(cosx)^2/(sinx)^4+(cosx)^4的积分
[(sinx)^2-(cosx)^2]/[sinx^4+cosx^4]
=-cos2x/[(sinx^2+cosx^2)^2-2sinx^2cosx^2]
=-cos2x/1-(sin2x)^2/2
∫[(sinx)^2-(cosx)^2]dx/[sinx^4+cosx^4]
=∫-cos2xdx/[1-(sin2x)^2/2]
=-∫dsin2x/(2-(sin2x)^2)
=[-1/(2√2)]∫(√2+sin2x+√2-sin2x)dsin2x/[2-(sin2x)^2]
=(-1/2√2)ln|(√2+sin2x)/(√2-sin2x)|+C
原式=-∫(cos2x)dx/{[(sinx)^2+(cosx)^2]-2(sinxcosx)^2}
=-∫(cos2x)dx[1-(1/2)(sin2x)^2]]
=-2∫(cos2x)dx[2-(sin2x)^2]
=-∫d(sin2x)/[2-(sin2x}^2]
令sin2x=u,
原式=-∫du/(2-u^2)
=-1/(2√2)∫[1/(...
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原式=-∫(cos2x)dx/{[(sinx)^2+(cosx)^2]-2(sinxcosx)^2}
=-∫(cos2x)dx[1-(1/2)(sin2x)^2]]
=-2∫(cos2x)dx[2-(sin2x)^2]
=-∫d(sin2x)/[2-(sin2x}^2]
令sin2x=u,
原式=-∫du/(2-u^2)
=-1/(2√2)∫[1/(√2-u)+1/(√2+u)]du
=(√2/4)ln|√2-u|-(√2/4)ln(√2+u|+C
=(√2/4)ln|(√2-sin2x)/(√2+sin2x)|+C.
收起
M=∫(x(cosx)^4)dx = 0 奇函数在对称区间上的定积分 N=∫ (x^2(sinx)+(cosx)^4) dx = ∫ (cosx)^4 dx > 0 P=∫(x^2(sinx)^3-(