Question

`f(x)=x^2`. The graph of `f` is shifted vertically `3` up, and then scaled vertically by a factor of `5`. The result is the graph of `ax^2+bx+c` where `a = 5, b= 0` and `c=` ?

Answer 1

`c=3` assuming that the vertical scaling factor applied is referenced to the vertex of the parabola and not the origin.

Explanation:

The simplest way to solve this question is to think of the `y`-intercept of the graph, in other words the point where `x=0`. We start with the graph of `y=x^2` which is then shifted up by `3`. This implies that our new `y`-intercept is at `y=3`. In coordinate form, this is the point `(0,3)` which is also the vertex of the parabola.

This assumes that the vertical scaling that is then applied is done so to the parabola while leaving the vertex at `(0,3)`. Therefore, we can simply solve the equation

`y = ax^2+bx+c`

where

`y=3, x=0, a=5` and `b=0`

`=> c = 3`