∫xcos(X² 1)dx

∫(sin2x)/(sin²x)dx=∫(2sinxcosx)/(sin²x)dx=2∫cosx/sinxdx=2∫(1/sinx)d(sinx)=2ln|sinx|+C_____

∫xcos(3x)dx=xsin(3x)/3-1/3∫sin(3x)dx(应用分部积分法)=xsin(3x)/3+cos(3x)/9+C(C是积分常数)∫xln(x+1)dx=x²ln(x+

∫xcos(4x^2+5)dxlet4x^2+5=tdt=d(4x^2+5)=4d(x^2)=4*2xdx=8xdxsodx=[dt/8x]∫xcos(4x^2+5)dx=∫xcostdt/8x=1/

∫xcos(x/2)dx=2∫xcos(x/2)d(x/2)=2∫xdsin(x/2)=2xsin(x/2)-2∫sin(x/2)dx=2xsin(x/2)-4∫sin(x/2)d(x/2)=2xsi

原式=∫4dx/(2sinxcosx)²=4∫dx/sin²2x=2∫csc²2xd2x=-2cot2x+C

利用半角公式如图降次计算.经济数学团队帮你解答,请及时采纳.

∫√arctanxdx/(1+x^2)=∫√arctanxdarctanx=(2/3)√(arctanx)^3+C∫(arcsinx)^2dx/√(1-x^2)=∫(arcsinx)^2darcsin

intln(tanx)/(sinxcosx)dx=intln(tanx)*cosx/sinx*1/cos^2xdx=intln(tanx)*1/tanxd(tanx)=intln(tanx)d[ln(

∫(cos²x-sin²x)/(sin²xcos²x)dx=∫cos2x/[(1/2)²sin²2x]dx=2∫1/sin²2xd

1、-1/9*(1+3*x)*e^(-3*x)+C2、1/16*cos(4*x+3)+1/16*(4*x+3)*sin(4*x+3)-3/16*sin(4*x+3)+C3、x*(-1/2*cos(x)

∫(1/sin²xcos²x)dx=∫(sin2x+cos2x/sin²xcos²x)dx=∫(1/sin²x+1/cos²x)dx=-co

用分部积分∫xcos（x/2）dx=2∫xcos(x/2)d(x/2)=2∫xdsin(x/2)=2xsin(x/2)-2∫sin(x/2)dx=2xsin(x/2)-4∫sin(x/2)d(x/2)

原式=0.5∫cos(1+x²)d(x²)=0.5sin(1+x²)+C再问：能给下过程么？3Q再答：这都是可以直接积分的，xdx=0.5d(x²)=0.5d(

∫arctan(1/x)dx=∫(x)'arctan(1/x)dx=xarctan(1/x)-∫x*{1/[1+x^(-2)]}*[-1/x^2]dx=xarctan(1/x)+∫1/(x+1/x)d

∫xcos(x^2)dx=∫cos(x^2)(xdx)=∫cos(x^2)(d(x^2)/2)=(1/2)∫cos(x^2)d(x^2)=(1/2)sin(x^2)+C

∫xcos(x/3)dx=3∫xdsin(x/3)=3xsin(x/3)-3∫sin(x/3)dx+C=3xsin(x/3)+9cos(x/3)+CC为任意常数

1.∫(x√x+1/x^2)dx=∫x^(3/2)dx+∫x^(-2)dx=(2/5)x^(5/2)+(-1)x^(-1)+C=(2/5)x^(5/2)-x^(-1)+C2.∫xe^xdx=∫xd(e

1/[(sinx)^3(cosx)^3]=[sinx/(cosx)^3]+(2/sinxcosx)+[cosx/(sinx)^3]∫(1/sin³xcos³x)dx=[(1/2)/

∫sin^2xcos^3xdx=∫sin^2x(1-sin^2x)dsinx=∫sin^2x-sin^4xdx=(1/3)sin^3x-(1/5)sin^5x+C不是让你求助我吗.再问：∫sin^2x