早教吧作业答案频道 -->数学-->
1/x^8*(1+x^2)的不定积分是1/(x^8*(1+x^2))
题目详情
1/x^8*(1+x^2)的不定积分
是1/(x^8*(1+x^2))
是1/(x^8*(1+x^2))
▼优质解答
答案和解析
若是∫(1+x²)/x^8 dx
= ∫(x^-8 + x^-6) dx
= x^(-8+1) / (-8+1) + x^(-6+1) / (-6+1) + C
= -1/[7x^7] - 1/[5x^5]
= -[7x²+5] / [35x^7] + C
若是∫dx/[x^8(1+x²)]
令1/[x^8*(1+x²)] = A/x^8 + B/x^6 + C/x^4 + D/x^2 + E/(x²+1)
待定系数法,召唤答案~
A = 1,B = -1,C = 1,D = -1,E = 1
原式= ∫[1/x^8 - 1/x^6 + 1/x^4 - 1/x^2 + 1/(x²+1)] dx
= -1/[7x^7] + 1/[5x^5] + 1/[3x^3] + 1/x + arctanx + C
= ∫(x^-8 + x^-6) dx
= x^(-8+1) / (-8+1) + x^(-6+1) / (-6+1) + C
= -1/[7x^7] - 1/[5x^5]
= -[7x²+5] / [35x^7] + C
若是∫dx/[x^8(1+x²)]
令1/[x^8*(1+x²)] = A/x^8 + B/x^6 + C/x^4 + D/x^2 + E/(x²+1)
待定系数法,召唤答案~
A = 1,B = -1,C = 1,D = -1,E = 1
原式= ∫[1/x^8 - 1/x^6 + 1/x^4 - 1/x^2 + 1/(x²+1)] dx
= -1/[7x^7] + 1/[5x^5] + 1/[3x^3] + 1/x + arctanx + C
看了 1/x^8*(1+x^2)的...的网友还看了以下: