Question

What is the slope of the tangent line of `(y/x)e^(x/y)= C`, where C is an arbitrary constant, at `(1,2)`?

Answer 1

slope `= 2`

Explanation:

Start with the given `(y/x)e^(x/y) = C` at `(1, 2)`

obtain the derivative of both sides of the equation

`(y/x)e^(x/y)*((y*1-x*y')/y^2)+e^(x/y)*((xy'-y*1)/x^2)=0`

After dividing both sides by `e^(x/y)`

`(y/x)*((y*1-x*y')/y^2)+((xy'-y*1)/x^2)=0`

`-y'/y+y'/x=y/x^2-1/x`

`y'(1/x-1/y)=y/x^2-1/x`

`y' = (y/x^2-1/x)/(1/x-1/y)`

substitute now the values `x=1` and `y=2`

`y' = (2/1^2-1/1)/(1/1-1/2)=(2-1)/(1-1/2)=2`