How do you factor the expression #4x^2+5x-9#?

2 Answers
Mar 19, 2016

Notice that the sum of the coefficients is zero and hence find factorisation:

#4x^2+5x-9 = (x-1)(4x+9)#

Explanation:

Notice that the sum of the coefficients is #0#. That is: #4+5-9 = 0#.

So #x = 1# is a zero and #(x-1)# a factor:

#4x^2+5x-9 = (x-1)(4x+9)#

Mar 19, 2016

I llike the 'ac' method as it is a bulletproof method.
the product of coefficients 'a' and c is -36 so we need one +ve and one -ve.

now we systematically list the factors of 36 and we'll worry about the assignment of the +ve and -ve later.

1 x 36
2 x 18
3 x 12
4 x 9 and
6 x 6

SEARCH the listing for a 'pair' of factors with one +ve and one -ve so that we get a TOTAL of 'b' or total of 5 in this case.
This will occur with -4 and +9

so now we split up the middle term (the linear term) using these values:

#4x^2-4x+9x-9#
There are now four terms and each PAIR of terms will always have a common factor (this is why this method is 'bulletproof'.

#4x(x-1)+9(x-1)#

that's pretty cool.
Now you have a sum of two terms and (x - 1) is common to both of them and can be factored again to:

(x - 1)( 4x + 9)
done