Question

How do you solve `p/(p-2) - 1/2 = 3/(3p-6)`?

Answer 1

`p=0`

Explanation:

Find a common denominator.

I can see that `3p-6` is actually `3(p-2)` There's also a `2` in `1/2`. So a common denominator is `6(p-2)`

Take this common denominator and multiply everything by that:

`6p-3(p-2)=6`

Distribute the `3`

`6p-3p+6=6`

Combine the `p`s:

`3p+6=6`

Subtract `6` on both sides:

`3p=0`

Divide `3` on both sides to solve for `p`:

`p=0`

Plug `p=0` back into the equation to make sure it works:

`(0/(0-2))-(1/2)=3/(3(0)-6)`

`-1/2=3/-6`

Simplifying `3/-6` would get `-1/2` so the answer works!

Answer 2

`p = 0`

Explanation:

Multiply both sides by `3 p - 6`:
`1/2 (6 - 3 p) + (p (3 p - 6))/(p - 2) = 3`

Rewrite the left hand side by combining fractions. `1/2 (6 - 3 p) + (p (3 p - 6))/(p - 2) = (3 (p + 2))/2`:

`(3 (p + 2))/2 = 3`

Multiply both sides by `2/3`:
`p + 2 = 2`

Subtract 2 from both sides:
Answer:
`p = 0`