搜搜做题作业网大学高数,特殊函数的积分.
来源:学生作业帮 编辑:搜搜做题作业网作业帮 分类:数学作业 时间:2024/05/14 11:33:51
大学高数,特殊函数的积分.
∫1/(x²+1)(x²+x+1)
=∫[(-x)/(x²+1)+(x+1)/(x²+x+1)]
=∫[(-x)/(x²+1)+(x+1)/(x²+x+1)]
=(-1/2)ln(x²+1)+∫(x+1)/(x²+x+1)
∫(x+1)/(x²+x+1)
令x+1/2=t,则:dx=dt.
∴∫[(x+1)/(x²+x+1)]dx
=∫{[(x+1/2)+1/2]/[(x²+x+1/4)+3/4]}dx
=∫{[(x+1/2)+1/2]/[(x+1/2)²+3/4]}d(x+1/2)
=∫[(t+1/2)/(t²+3/4)]dt
=∫{t/(t²+3/4)]dt+(1/2)∫[1/(t²+3/4)]dt
=(1/2)∫[1/(t²+3/4)]d(t²+3/4)+(1/2)×(4/3)∫[1/[(2t/√3)²+1]}dt
=(1/2)ln(t²+3/4)+(2/3)×(√3/2)∫{1/[(2t/√3)²+1]}d(2t/√3)
=(1/2)ln[(x+1/2)²+3/4]+(√3/3)arctan(2t/√3)+C
=(1/2)ln(x²+x+1)+(√3/3)arctan[2(x+1/2)/√3]+C
=(1/2)ln(x²+x+1)+(√3/3)arctan[(2x+1)/√3]+C.
∫1/(x²+1)(x²+x+1)
=-(1/2)ln(x²+1)+(1/2)ln(x²+x+1)+(√3/3)arctan[(2x+1)/√3]+C.
再问: 其实你可以拍张照片作为解题步骤
再问: 我这样看不明白
=∫[(-x)/(x²+1)+(x+1)/(x²+x+1)]
=∫[(-x)/(x²+1)+(x+1)/(x²+x+1)]
=(-1/2)ln(x²+1)+∫(x+1)/(x²+x+1)
∫(x+1)/(x²+x+1)
令x+1/2=t,则:dx=dt.
∴∫[(x+1)/(x²+x+1)]dx
=∫{[(x+1/2)+1/2]/[(x²+x+1/4)+3/4]}dx
=∫{[(x+1/2)+1/2]/[(x+1/2)²+3/4]}d(x+1/2)
=∫[(t+1/2)/(t²+3/4)]dt
=∫{t/(t²+3/4)]dt+(1/2)∫[1/(t²+3/4)]dt
=(1/2)∫[1/(t²+3/4)]d(t²+3/4)+(1/2)×(4/3)∫[1/[(2t/√3)²+1]}dt
=(1/2)ln(t²+3/4)+(2/3)×(√3/2)∫{1/[(2t/√3)²+1]}d(2t/√3)
=(1/2)ln[(x+1/2)²+3/4]+(√3/3)arctan(2t/√3)+C
=(1/2)ln(x²+x+1)+(√3/3)arctan[2(x+1/2)/√3]+C
=(1/2)ln(x²+x+1)+(√3/3)arctan[(2x+1)/√3]+C.
∫1/(x²+1)(x²+x+1)
=-(1/2)ln(x²+1)+(1/2)ln(x²+x+1)+(√3/3)arctan[(2x+1)/√3]+C.
再问: 其实你可以拍张照片作为解题步骤
再问: 我这样看不明白