作业帮这题不定积分怎么做
来源:学生作业帮 编辑:拍题作业网作业帮 分类:数学作业 时间:2024/04/30 23:35:44
这题不定积分怎么做
∫(1-x^2)^(-3/2) dx
= ∫ (1/x )d(1/√(1-x^2) )
= 1/[x√(1-x^2)] + ∫ dx/[x^2√(1-x^2)]
let
x= siny
dx = cosy dy
∫ dx/[x^2√(1-x^2)]
=∫ (cscy)^2 dy
=-coty + C'
=-√(1-x^2)/x + C'
∫(1-x^2)^(-3/2) dx
= 1/[x√(1-x^2)] + ∫ dx/[x^2√(1-x^2)]
=1/[x√(1-x^2)] -√(1-x^2)/x + C
=x/√(1-x^2) + C
= ∫ (1/x )d(1/√(1-x^2) )
= 1/[x√(1-x^2)] + ∫ dx/[x^2√(1-x^2)]
let
x= siny
dx = cosy dy
∫ dx/[x^2√(1-x^2)]
=∫ (cscy)^2 dy
=-coty + C'
=-√(1-x^2)/x + C'
∫(1-x^2)^(-3/2) dx
= 1/[x√(1-x^2)] + ∫ dx/[x^2√(1-x^2)]
=1/[x√(1-x^2)] -√(1-x^2)/x + C
=x/√(1-x^2) + C