How do you factor $k^{2} - 13 k + 40$ $k^2-13k+40$ ?

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How do you factor $k^{2} - 13 k + 40$ $k^2-13k+40$ ?

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Answer 1 · 2015-05-19T03:41:05

We can Split the Middle Term of this expression to factorise it.

In this technique, if we have to factorise an expression like $a k^{2} + b k + c$ $ak^2 + bk + c$ , we need to think of 2 numbers such that:
$N_{1} \cdot N_{2} = a \cdot c = 1 \cdot 40 = 40$ $N_1*N_2 = a*c = 1*40 = 40$
AND
$N_{1} + N_{2} = b = - 13$ $N_1 +N_2 = b = -13$
After trying out a few numbers we get $N_{1} = - 8$ $N_1 = -8$ and $N_{2} = - 5$ $N_2 =-5$
$- 8 \cdot - 5 = 40$ $-8*-5 = 40$ , and $- 8 + (- 5) = - 13$ $-8+(-5)= -13$

$k^{2} - 13 k + 40$ $k^2-13k+40$ = $k^{2} - 8 k - 5 k + 40$ $k^2-8k-5k+40$

$= k (k - 8) - 5 (k - 8)$ $= k(k-8) - 5(k-8)$

$(k - 8)$ $(k-8)$ is a common factor to each of the terms

$= (k - 8) (k - 5)$ $=color(green)((k-8)(k-5)$

Answer 2 · 2015-05-19T04:39:38

There is another way that avoids the lengthy factoring by grouping.
$f (x) = x^{2} - 13 x + 40 =$ $f(x) = x^2 - 13x + 40 =$ (x - p)(x - q).
Find 2 numbers p and q knowing product c = 40 and sum b = -13.
Compose factor pairs of (40). Proceed: (2, 20)(4, 10)(5, 8). This last sum is 13 = -b.
Then p = -5 and q = -8

f(x) = (x - 5)(x - 8).

No need to factor by grouping.

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How do you factor $k^{2} - 13 k + 40$ $k^2-13k+40$ ?

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