搜狗做题网高数高手请进,求微积分
来源:学生作业帮 编辑:搜狗做题网作业帮 分类:数学作业 时间:2024/04/30 05:48:29
高数高手请进,求微积分
∫1/1+sinx dx
∫(arctan1/x)/1+x^2 dx
∫x^3/(1+x^2)^(1/2) dx
∫ln(tanx)/sin(cosx) dx
分太少了,但是已经倾其所有啦,很不好意思请大家帮帮忙
∫1/1+sinx dx
∫(arctan1/x)/1+x^2 dx
∫x^3/(1+x^2)^(1/2) dx
∫ln(tanx)/sin(cosx) dx
分太少了,但是已经倾其所有啦,很不好意思请大家帮帮忙
第一个:∫1/1+sinx dx
万能代换 t=tan(x/2),
1/(1+sinx)dx=1/(1+2t/(1+t^2))*2t/(1+t^2)dt=2t/(1+t)^2dt=(2/(1+t)-2/(1+t)^2)dt=2ln(1+t)+2/(1+t)+C=2ln(1+tan(x/2)+2/(1+tan(x/2))+C
第二个:∫(arctan1/x)/1+x^2 dx
∫[arctan(1/x)]dx/(1+x²)
=-∫[x²arctan(1/x)]d(1/x)/(1+x²)
=-∫[arctan(1/x)]d(1/x)/(1+1/x²)
=-∫[arctan(1/x)]darctan(1/x)
=-1/2[arctan(1/x)]^2+c
第三个:
∫x^2 * arctanxdx
=1/3×∫arctanxd(x^3)
=1/3×x^3×arctanx-1/3×∫x^3/(1+x^2)
=1/3×x^3×arctanx-1/3×∫(x^3+x-x)/(1+x^2)
=1/3×x^3×arctanx-1/3×∫xdx+1/3×∫x/(1+x^2)
=1/3×x^3×arctanx-1/6×x^2+1/6×ln(1+x^2)+C
第四个:
万能代换 t=tan(x/2),
1/(1+sinx)dx=1/(1+2t/(1+t^2))*2t/(1+t^2)dt=2t/(1+t)^2dt=(2/(1+t)-2/(1+t)^2)dt=2ln(1+t)+2/(1+t)+C=2ln(1+tan(x/2)+2/(1+tan(x/2))+C
第二个:∫(arctan1/x)/1+x^2 dx
∫[arctan(1/x)]dx/(1+x²)
=-∫[x²arctan(1/x)]d(1/x)/(1+x²)
=-∫[arctan(1/x)]d(1/x)/(1+1/x²)
=-∫[arctan(1/x)]darctan(1/x)
=-1/2[arctan(1/x)]^2+c
第三个:
∫x^2 * arctanxdx
=1/3×∫arctanxd(x^3)
=1/3×x^3×arctanx-1/3×∫x^3/(1+x^2)
=1/3×x^3×arctanx-1/3×∫(x^3+x-x)/(1+x^2)
=1/3×x^3×arctanx-1/3×∫xdx+1/3×∫x/(1+x^2)
=1/3×x^3×arctanx-1/6×x^2+1/6×ln(1+x^2)+C
第四个: