How do you solve #2x ^ { 2} + 23x + 63= 0#?

1 Answer
Jun 10, 2017

Find factors and let each one be equal to #0#

#x = -9/2 or x = -7#

Explanation:

When solving a quadratic equation, try to factorise the trinomial first:

#2x^2 +23x +63 =0#

In this case, find factors of #2 and 63# such that their products ADD to #23#

#color(white)(xxxxx)2 and 63#
#color(white)(x.xxx)darr and darr#

#color(white)(xxxxx)2color(white)(wwwww)9 " "rarr 1 xx 9 = 9#
#color(white)(xxxxx)1color(white)(wwwww)7 " "rarr 2xx 7 = ul14#
#color(white)(xxxxxx.xxxxxxxxxxxxxxxx)23#

#2x^2 +23x +63 =0#
#(2x+9)(1x+7)=0#

Either bracket can be equal to #0#

If #2x+9 = 0 " "rarr x = -9/2#

If #x+7 =0" "rarr x = -7#