Question

How do you factor `w^2 + 14w-1632=0`?

Answer 1

`(w-34)(w+48) = 0`

Explanation:

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Method 1 - Completing the square

`0 = w^2+14w-1632`

`= (w+7)^2-49-1632`

`= (w+7)^2-1681`

`= (w+7)^2-41^2`

`= ((w+7)-41))((w+7)+41)`

`= (w-34)(w+48)`

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Method 2 - Find pair of factors

We want to find a pair of factors of `1632` which differ by `14`.

Since `14` is somewhat smaller than `1632` they will be approximately `sqrt(1632)-7` and `sqrt(1632)+7`.

Note that `40^2 = 1600` and `41^2 = 1681`

So:

`sqrt(1632) ~~ 41.5`

`sqrt(1632)-7 ~~ 34.5`

`sqrt(1632)+7 ~~ 48.5`

Of the nearby numbers, find that `34` and `48` are both factors of `1632` and they differ by `14`, so:

`w^2+14w-1632 = (w+48)(w-34)`