Question

How do you solve `v^ { 2} - 20v = 7`?

Answer 1

`v = 10 +- sqrt(107)`

Explanation:

We have

`v^2 - 20v= 7`

We will use "Completing The Square Method" to simplify.

Observe that our quadratic equation is in "Vertex Form".

`v^2 - 20v + square = 7 + square` `color(red)(Equation.1)`

What goes into the box above?

Divide the coefficient of our `v` term by 2 and square it. This is the value that goes into the box above.

Coefficient of our `v` term is `(-20)`. Divide this by 2 and square the value to get 100.

Now our `color(red)(Equation.1)` becomes

`v^2 - 20v + 100 = 7 + 100` `color(red)(Equation.2)`

Now, we can write `v^2 - 20v + 100` as `(v" " color(green)( - 10))^2`

We get `color(green)((-10))` by dividing the coefficient of our `v` term by 2.

This is the reason why we use "Completing The Square Method" to simplify.

Now, we have, using `color(red)(Equation.2),`

`(v - 10)^2 = 107`

Take square root on both sides

`sqrt((v-10)^2) = +-sqrt(107`

Hence, we get

`(v - 10) = +-sqrt(107)`

Therefore, our final answer is given by

`v = 10 +-sqrt(107)`

which gives us two values for `v`

`v = 20.3; v = -0.3`

Answer 2

Solution: `v~~20.344 , v~~ -0.344`

Explanation:

`v^2-20v=7 or v^2-20v+100 =100+7` or

`(v-10)^2 =107 or v-10 = +-sqrt107` or

`v = 10+-sqrt107:. v=10 +10.344~~20.344 (3dp)` or

`v=10 -10.344~~-0.344 (3dp)`

Solution: `v~~20.344 , v~~ -0.344` [Ans]