Question

How do you factor `2x^2 - 3xy - 2y^2`?

Answer 1

Reformulate as a quadratic in a single variable, use the quadratic formula, then reformulate back to find:

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

Explanation:

If you divide the quadratic through by `y^2`, then you get:

`(2x^2)/y^2-(3xy)/y^2-(2y^2)/y^2 = 2(x/y)^2-3(x/y)-2`

Let `t = x/y` and `f(t) = 2t^2-3t-2`

To factor `f(t)`, find roots of `f(t) = 0` using the quadratic formula.

`f(t) = 2t^2-3t-2` is of the form `at^2+bt+c`, with `a=2`, `b=-3` and `c = -2`. So `f(t) = 0` has roots given by the quadratic formula:

`t = (-b+-sqrt(b^2-4ac))/(2a) = (3+-sqrt((-3)^2-(4xx2xx-2)))/(2xx2)`

`=(3+-sqrt(9+16))/4 = (3+-sqrt(25))/4 = (3+-5)/4`

That is `t = -1/2` or `t = 2`

So `f(t)` has factors `(2t+1)` and `(t - 2)`:

`2t^2-3t-2 = (2t+1)(t-2)`

Substitute `t = x/y` to find:

`2(x/y)^2-3(x/y)-2 = (2(x/y)+1)((x/y)-2)`

Then multiply through by `y^2` to get:

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

Answer 2

2`x^2` - 3xy - 2`y^2` = 2`x^2` - 4xy + xy - 2 `y^2` = 2x(x - 2y) + y (x - 2y)
= (x - 2y) (2x + y)

Explanation:

Here we write 3xy as -4xy + xy because the product of 2 and -4 the extreme coefficients equals the -4, so that the grouping of terms is made possible.