-2csc^2xcotx
y′=(csc^2x)′
=[(sinx)^-2]′
=-2(sinx)^-3*sinx′
=-2(sinx)^-3*cosx
=-2(sinx)^-2*cotx
=-2csc^2xcotx
扩展资料:
常用导数公式:
1.y=c(c为常数) y'=0
2.y=x^n y'=nx^(n-1)
3.y=a^x y'=a^xlna,y=e^x y'=e^x
4.y=logax y'=logae/x,y=lnx y'=1/x
5.y=sinx y'=cosx
6.y=cosx y'=-sinx
7.y=tanx y'=1/cos^2x
8.y=cotx y'=-1/sin^2x
9.y=arcsinx y'=1/√1-x^2
10.y=arccosx y'=-1/√1-x^2
11.y=arctanx y'=1/1+x^2
12.y=arccotx y'=-1/1+x^2
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第1个回答 2019-05-02
第2个回答 2019-05-02
如图所示
谢谢啦
第3个回答 2019-05-02
二阶导数
y=tan(x+y)
y'=sec²(x+y)*(x+y)'
=sec²(x+y)*(1+y')
=sec²(x+y)+y'sec²(x+y)
y'-y'sec²(x+y)=sec²(x+y)
y'=sec²(x+y)/[1-sec²(x+y)]
=sec²(x+y)/{-[sec²(x+y)-1]}
=sec²(x+y)/[-tan²(x+y)]
=-1/cos²(x+y)*cos²(x+y)/sin²(x+y)
=-csc²(x+y)
y''=-2csc(x+y)*[-csc(x+y)cot(x+y)]*(x+y)'
=2csc²(x+y)cot(x+y)*(1+y')
=2csc²(x+y)cot(x+y)*[1-csc²(x+y)]
=2csc²(x+y)cot(x+y)*{-1[csc²(x+y)-1]}
=-2csc²(x+y)cot(x+y)*[cot²(x+y)]
=-2csc²(x+y)cot³(x+y)追问
y=tan(x+y)
y'=sec²(x+y)*(x+y)'
=sec²(x+y)*(1+y')
=sec²(x+y)+y'sec²(x+y)
y'-y'sec²(x+y)=sec²(x+y)
y'=sec²(x+y)/[1-sec²(x+y)]
=sec²(x+y)/{-[sec²(x+y)-1]}
=sec²(x+y)/[-tan²(x+y)]
=-1/cos²(x+y)*cos²(x+y)/sin²(x+y)
=-csc²(x+y)
y''=-2csc(x+y)*[-csc(x+y)cot(x+y)]*(x+y)'
=2csc²(x+y)cot(x+y)*(1+y')
=2csc²(x+y)cot(x+y)*[1-csc²(x+y)]
=2csc²(x+y)cot(x+y)*{-1[csc²(x+y)-1]}
=-2csc²(x+y)cot(x+y)*[cot²(x+y)]
=-2csc²(x+y)cot³(x+y)追问
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