如题·cosx的n次方的不定积分.
来源:学生作业帮助网 编辑:六六作业网 时间:2024/11/24 14:57:31
如题·cosx的n次方的不定积分.
如题·cosx的n次方的不定积分.
如题·cosx的n次方的不定积分.
Let Im,n=∫(sinx)^m*(cosx)^ndx
then Im,n=(sinx)^(m+1)*(cosx)^(n-1)-
∫(sinx)[(sinx)^m*(cosx)^(n-1)]'dx
=(sinx)^(m+1)*(cosx)^(n-1)-
∫[m(sinx)^m*(cosx)^n-(n-1)(sinx)^(m+2)*(cosx)^(n-1)]dx
=(sinx)^(m+1)*(cosx)^(n-1)-mIm,n+(n-1)Im+2,n-2
so (m+1)Im,n=(sinx)^(m+1)*(cosx)^(n-1)+(n-1)Im+2,n-2
用此递推公式求解
sin(ax)*cos(bx)
=(1/2)*[sin(a+b)x+sin(a-b)x]
so ∫sin(ax)*cos(bx)dx
=-(1/2)*[cos(a+b)x/(a+b)+cos(a-b)x/(a-b)]+C
Let Im,n=∫(sinx)^m*(cosx)^ndx
then Im,n=(sinx)^(m+1)*(cosx)^(n-1)-
∫(sinx)[(sinx)^m*(cosx)^(n-1)]'dx
=(sinx)^(m+1)*(cosx)^(n-1)-
∫[m(sinx)^m*(cosx)^n-(n-1)(sinx)^(m+2)*(cosx)^(n-1)]dx<...
全部展开
Let Im,n=∫(sinx)^m*(cosx)^ndx
then Im,n=(sinx)^(m+1)*(cosx)^(n-1)-
∫(sinx)[(sinx)^m*(cosx)^(n-1)]'dx
=(sinx)^(m+1)*(cosx)^(n-1)-
∫[m(sinx)^m*(cosx)^n-(n-1)(sinx)^(m+2)*(cosx)^(n-1)]dx
=(sinx)^(m+1)*(cosx)^(n-1)-mIm,n+(n-1)Im+2,n-2
so (m+1)Im,n=(sinx)^(m+1)*(cosx)^(n-1)+(n-1)Im+2,n-2
用此递推公式求解
sin(ax)*cos(bx)
=(1/2)*[sin(a+b)x+sin(a-b)x]
so ∫sin(ax)*cos(bx)dx
=-(1/2)*[cos(a+b)x/(a+b)+cos(a-b)x/(a-b)]+C
收起