神马作文网急求隐函数和参数式函数题(共3题)!
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急求隐函数和参数式函数题(共3题)!
隐函数(1)y=x^(1/y);
(2)y=tan(x+y);
参数式函数(3){x=t/(1+t^2)
y=t^2/(1+t^2)
我虽然能解一部分!但和书上的答案还是不一样比如;
(1)我解出来是lny=1/ylnx
y'/y=(1/y)'*lnx+1/y*(lnx)'
y'=1/x-lnx/y 可是书上答案是y'=1/x(1+lny)
(2)y'=sec(x+y)^2*(x+y)'
y'=sec(x+y)^2*(1+y')
y'=sec(x+y)^2/(1-sec(x+y)^2) 可书上是y'=-(1+1/y^2)
(3)dy/dx=(dy/dt)/(dt/dx)=[t^2/(1+t^2)]'/[t/(1+t^2)]'
=2t/(1+t^2-2t^2) 书上答案=2t/(1-t^2)
是我解错了还是没化到最简呢?
我做的第3题最后就2t/(1-t^2)看我都做晕了!
那我做的不对么?
隐函数(1)y=x^(1/y);
(2)y=tan(x+y);
参数式函数(3){x=t/(1+t^2)
y=t^2/(1+t^2)
我虽然能解一部分!但和书上的答案还是不一样比如;
(1)我解出来是lny=1/ylnx
y'/y=(1/y)'*lnx+1/y*(lnx)'
y'=1/x-lnx/y 可是书上答案是y'=1/x(1+lny)
(2)y'=sec(x+y)^2*(x+y)'
y'=sec(x+y)^2*(1+y')
y'=sec(x+y)^2/(1-sec(x+y)^2) 可书上是y'=-(1+1/y^2)
(3)dy/dx=(dy/dt)/(dt/dx)=[t^2/(1+t^2)]'/[t/(1+t^2)]'
=2t/(1+t^2-2t^2) 书上答案=2t/(1-t^2)
是我解错了还是没化到最简呢?
我做的第3题最后就2t/(1-t^2)看我都做晕了!
那我做的不对么?
1)lny=1/ylnx
y*lny=lnx 两边对x求导
d(y*lny)/dx=d(lnx)/dx
[lnydy+yd(lny)]/dx=1/x
lny*(dy/dx)+y*(1/y)*(dy/dx)=1/x
(1+lny)y'=1/x
y'=1/x(1+lny)
2)y=tan(x+y)=sin(x+y)/cos(x+y)
ycos(x+y)=sin(x+y)两边对x求导
d[ycos(x+y)]/dx=dsin(x+y)/dx
ydcos(x+y)/dx+y'cos(x+y)=cos(x+y)*d(x+y)/dx
-ysin(x+y)[d(x+y)/dx]+y'cos(x+y)=(1+y')cos(x+y)
-y(1+y')sin(x+y)=cos(x+y)
-y(1+y')tan(x+y)=1
y^2(1+y')=-1
y'=-(1+1/y^2)
3)你会了?
y*lny=lnx 两边对x求导
d(y*lny)/dx=d(lnx)/dx
[lnydy+yd(lny)]/dx=1/x
lny*(dy/dx)+y*(1/y)*(dy/dx)=1/x
(1+lny)y'=1/x
y'=1/x(1+lny)
2)y=tan(x+y)=sin(x+y)/cos(x+y)
ycos(x+y)=sin(x+y)两边对x求导
d[ycos(x+y)]/dx=dsin(x+y)/dx
ydcos(x+y)/dx+y'cos(x+y)=cos(x+y)*d(x+y)/dx
-ysin(x+y)[d(x+y)/dx]+y'cos(x+y)=(1+y')cos(x+y)
-y(1+y')sin(x+y)=cos(x+y)
-y(1+y')tan(x+y)=1
y^2(1+y')=-1
y'=-(1+1/y^2)
3)你会了?