Question

The vertex form of the equation of a parabola is `x = (y - 3)^2 + 41`, what is the standard form of the equation?

Answer 1

`y=+-sqrt(x-41)+3`

Explanation:

We need to solve for `y`. Once we've done that, we can manipulate the rest of the problem (if we need to) to change it tnto standard form:

`x=(y-3)^2+41`

subtract `41` on both sides

`x-41=(y-3)^2`

take the square root of both sides

`color(red)(+-)sqrt(x-41)=y-3`

add `3` to both sides

`y=+-sqrt(x-41)+3` or `y=3+-sqrt(x-41)`

The standard form of Square Root functions is `y=+-sqrt(x)+h`, so our final answer should be `y=+-sqrt(x-41)+3`