What is the equation of the tangent line of #f(x) =(2e^x)/(x-e^x)# at #x=3#?

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Answer 1 · 2017-04-29T07:06:49

Equation of tangent is #4e^3x-(3-e^3)^2y-2e^6-6e^3=0#

We are seeking a tangent to the curve #f(x)=(2e^x)/(x-e^x)# at #x=3# i.e. at the point #(3,f(3))# or #(3,(2e^3)/(3-e^3))#

As the slope of tangent is given by the value of its first derivative at that point, the slope is #f'(3)#.

As #f(x)=(2e^x)/(x-e^x)#, #f'(x)=((x-e^x)xx2e^x-2e^x(1-e^x))/(x-e^x)^2#

= #(2xe^x-2e^(2x)-2e^x+2e^(2x))/(x-e^x)^2#

= #(2xe^x-2e^x)/(x-e^x)^2#

= #(2e^x(x-1))/(x-e^x)^2#

and at #x=3#, slope is #(4e^3)/(3-e^3)^2#

and hence equation of tangent is

#(y-(2e^3)/(3-e^3))=(4e^3)/(3-e^3)^2(x-3)#

or #(3-e^3)^2y-2e^3(3-e^3)=4e^3x-12e^3#

or #4e^3x-(3-e^3)^2y+2e^3(3-e^3)-12e^3=0#

or #4e^3x-(3-e^3)^2y-2e^6-6e^3=0#