∫ x^3 (9 x^2) dx
来源:学生作业帮助网 编辑:作业帮 时间:2024/10/03 14:19:35
∫x^3/(9+x^2)dx=1/2∫x^2/(9+x^2)dx^2(x^2=t)=1/2∫t/(9+t)dt=1/2∫(t+9-9)/(9+t)dt=1/2∫[1-9/(9+t)]dt=1/2t-9
x^2/[(x-3)(x+2)^2=(9/25)[1/(x-3)]+(16/25)[1/(x+2)]-(20/25)[1/(x+2)^2].原式=(9/25)∫1/(x-3)dx+(16/25)∫1/
我来给你做吧,首先被积函数分子分母同除以9^x变形,看下图吧
(x^2-x+6)/(x^3+3x)=2/x-(x+1)/(x^2+3).原式=∫2/xdx-∫(x+1)/(x^2+3)dx=2ln|x|-(1/2)ln(x^2+3)-(1/√3)arctan(x
原式=∫[2/x-2/(x+1)-2/(x+1)²+1/(x+1)³]dx=2ln│x│-2ln│x+1│+2/(x+1)-(1/2)/(x+1)²+C(C是积分常数)=
∫(1-x)^2/x^3dx=∫(1-2x-x^2)/x^3dx=∫(x^(-3)-2x^(-2)+x^(-1))dx=1/(-3+1)x^(-3+1)-1/(-2+1)x^(-2+1)+ln|x|+
设x+3=t→dx=dt,代入原式得∫[(2x²+3x-5)/(x+3)]dx=∫[(2(t-3)²+3(t-3)-5)/t]dt=∫[2t+(4/t)-9]dt=t²+
∫x^3/(9+x^2)dx=∫[x-9x/(9+x^2)]dx=∫xdx-9/2∫1/(9+x^2)dx^2=∫xdx-9/2∫1/(9+x^2)d(9+x^2)=1/2x^2-9/2ln(9+x^
∫(x²-2x+1)/x³dx=∫(1/x-2/x²+1/x³)dx=lnx+2/x-2/x²+C
∫x^3/(1+x^2)dx=∫[x^3+x-x]/(1+x^2)dx=∫x-x/(1+x^2)dx=x²/2-1/2ln[1+x^2]+c你的好评是我前进的动力.我在沙漠中喝着可口可乐,唱
∫2^x*3^x/(9^x-4^x)dx=∫(2/3)^xdx/[1-(4/9)^x]=[ln(2/3)]^(-1)∫d[(2/3)^x]/{1-[(2/3)^x]^2}={[ln(2/3)]^(-1
(x^2)/2-18x^(1/2)+3x+C0.5*x^2+2*x^(1/2)+C9x-2x^3+0.2*x^5+C
(x^3-3x^2+4x-9)/(x^2+3)=x-3+x/(x^2+3)原式=∫xdx-∫3dx+∫x/(x^2+3)dx=x^2/2-3x+1/2∫d(x^2+3)/(x^2+3)=x^2/2-3
具体见图片内容:再问:第二步怎么来的?没认真听课现在看起来很吃力麻烦讲解下我会提高悬赏的再答:就是自然对数lnx求导的形式:(lnx)'=1/x
原式=-1/3∫e^-X^3d(-X^3)=-1/3e^-X^3+c
我想你的题应该是这样吧∫x³/(9+x²)dx=(1/2)∫x²/(9+x²)d(x²)=(1/2)∫(x²+9-9)/(9+x²
∫x^3/(9+x^2)dx=1/2∫x^2/(9+x^2)dx^2(x^2=t)=1/2∫t/(9+t)dt=1/2∫(t+9-9)/(9+t)dt=1/2∫[1-9/(9+t)]dt=1/2t-9
这两个答案是一样的啊1/2*(9+x^2)-ln|9+x^2|和1/2*(x^2)-ln|9+x^2|都是原函数,两者相差9/2,是一个常数,所以两个答案都是正确的,因为后面的+C可以是任意常数
展开得到原积分=∫4^x+2*6^x+9^xdx=4^x/ln4+2*6^x/ln6+9^x/ln9+C,C为常数再问:(⊙o⊙)哦看懂了谢谢再答:不必客气的啊~