∫x3/√(1-x2)dx
发布网友
发布时间:2022-04-26 03:53
共3个回答
热心网友
时间:2022-05-01 23:19
令t=√(1-x²),则t²=1-x²,x²=1-t²
原式=½∫(1-t²)d(1-t²)/t=∫(t²-1)dt=1/3t³-t+C
x=0时,t=1;x=1时,t=0
∴∫(0~1)[x^3/√(1-x^2)]dx = ∫(1~0)(t²-1)dt=0-1/3+1=2/3追问我要求的是瑕积分,而你求的是不定积分 =½∫(1-t²)d(1-t²)/t除以t,(1-t^2)/t还是[(1-t²)d(1-t²)]/t
热心网友
时间:2022-05-02 00:37
∫(0~1)[x^3/√(1-x^2)]dx = ∫(0~π/2) [(sint)^3/cost] cost dt
= ∫(0~π/2) (sint)^3 dt
= - ∫(0~π/2) [1-(cost)^2] d(cost)
= - [cost - 1/3*(cost)^3] | (0,π/2)
= - { [cos0 - 1/3*(cos0)^3] - [cos(π/2) - 1/3*(cos(π/2))^3]}
= - { [ 1 - 1/3] - [ 0 - 0] }
= 2/3追问我要求的是瑕积分,而你求的是不定积分 - { [ 1 - 1/3] - [ 0 - 0] }好像不等于2/3 而是等于-2/3
热心网友
时间:2022-05-02 02:12
设x=sint,t=arcsinx,1-x^2=(cost)^2,dx=costdt
原式=∫[0,π/2](sint)^3dt
=∫[0,π/2](sint)^2dcost
=∫[0,π/2](1-cos^2t)dcost
=∫[0,π/2]dcost-∫[0,1]cos^2tdcost
=cost|[0,π/2]-1/3cos^3t|[0,π/2]
=-1-1/3(0-1)
=-1+1/3=-2/3追问我们书后答案是2/3而不是-2/3 你们求的都不是瑕积分
