Question

How do you find the equations of the tangent lines to the curve `y= (x-1)/(x+1)` that are parallel to the line x-2y=5?

Answer 1

We have two tangents which are

`x-2y-1=0` and `x-2y+7=0`

Explanation:

As `y=(x-1)/(x+1)` and slope of tangent s given by function's derivative, let us first find `(dy)/(dx)`, which is given by

`((x+1)xx1-1xx(x-1))/(x+1)^2` or `2/(x+1)^2`

As the tangent is parallel to line `x-2y=5`, whose slope is `1/2`

(we get this converting equation of given line to slope intercept form i.e. `y=1/2x-5/2`)

Hence we should have `2/(x+1)^2=1/2` or `(x+1)^2=4`, which gives us `x=1` or `x=-3` i.e. we will have two tangents parallel to `x-2y=5`

Further at `x=1`, `y=(1-1)/(1+1)=0` i.e. tangent to curve is at `(1,0)`

and at `x=-3`, `y=(-3-1)/(-3+1)=-4/-2=2` i.e. curve passes through `(-3,2)`

Hence the two tangents will be `(y-0)=1/2(x-1)` or `2y=x-1`

and `(y-2)=1/2(x+3)` or `2y-4=x+3`

or `x-2y-1=0` and `x-2y+7=0`