Question

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

Answer 1

`1`

Explanation:

Making `z = x-y` we have

`ze^z=C` or `z= W(C)` where `W(cdot)` is the Lambert Function.

then `z = z_0 = W(C)`

Now `x_0 = x-y` and `dx=dy` or `dy/dx=1`

and finally

`dy/dx=1`

Answer 2

The slope of the tangent line is `m=1`

Explanation:

Differentiate the equation implicitly:

`d/dx ((x-y)e^(x-y) )= 0`

`(x-y)d/dx(e^(x-y)) + (1-y')e^(x-y) = 0`

`(x-y)(1-y')e^(x-y) + (1-y')e^(x-y) = 0`

`(x-y+1)(1-y')e^(x-y) = 0`

As `e^t != 0` this implies:

`(x-y+1)(1-y') = 0`

We have then two possible solutions:

`(1)" " (1 -y') = 0`

`dy/dx = 1`

`y = x + a`

or:

`(2)" "(x-y+1) = 0`

`y = x+1`

which is just the particular case of `(1)` for `a = 1`.

Thus:

`y=x+a`

is the general solution, which is always a straight line of slope `m=1` for any `C` coincident with ts tangent.