Question

How do you find the equation of the normal line to the parabola `y=x^2-5x+4` that is parallel to the line `x-3y=5`?

Answer 1

The normal is:

`y=1/3(x-1)`

Explanation:

The general equation of the normal line is:

`y(xi) -f(x) = - 1/(f'(x))(xi-x)`

If we put the equation of the line in the same form:

`y=1/3(x-5)`

we can see the two lines are parallel when

`-1/(f'(x)) = 1/3`

`f'(x) = -3`

Take the derivative of f(x):

`f'(x) = 2x-5`

and fond the value of `x` for which `f'(x) = -3`

`2x-5=-3`

`x=1`

The desired normal line is:

`y - f(1) = -1/(f'(1))(x-1)`

`y=1/3(x-1)`