How do you find the product of #(8x + 5) (2x + 9) #?
1 Answer
Aug 1, 2016
Explanation:
We must ensure that each term in the 2nd bracket is multiplied by each term in the first bracket. This can be achieved as follows.
#color(red)((8x+5))(2x+9)=color(red)(8x)(2x+9)color(red)(+5)(2x+9)# distribute the brackets.
#=16x^2+72x+10x+45# collecting 'like terms' gives:
#16x^2+82x+45#
#rArr(8x+5)(2x+9)=16x^2+82x+45#
#color(blue)"-------------------------------------------------------"# There is another method referred to as FOIL, where
F- the First term in each bracket (multiply together)
O- the Outer term in each bracket (multiply together)
I - the Inner term in each bracket (multiply together)
L - the Last term in each bracket (multiply together)
#rArr(8x+5)(2x+9)#
#=(8x xx2x)+(9xx8x)+(5xx2x)+(5xx9)#
#=16x^2+72x+10x+45=16x^2+82x+45#
