Question

What is the slope of the tangent line of `e^(xy)-e^x/y = C`, where C is an arbitrary constant, at `(0,1)`?

Answer 1

The slope is `m=0`

Explanation:

If the curve goes through the point `(0,1)` then we have:

`e^(0xx1) -e^0/1 =C`

`1-1 = C`

`C = 0`

So the only curve of the family going through that point would be:

`e^(xy) = e^x/y`

Taking the logarithm of both sides we have:

`xy = x -lny`

Now if `y=1` this equation becomes `x=x`, which is satisfied by any value of `x`

If `y!=1` we have:

`x = lny/(1-y) !=0`

So the curve passing through the point `(0,1)` is the straight line `y=1`, and the tangent is the horizontal line itself with slope `m=0`.