How do you factor #a^3b^3-16ab^3#?
1 Answer
May 6, 2016
Explanation:
Looking for common factors in the 2 terms.
from
#a^3" and a we get " a# from
#b^3 and" b^3→ b^3#
#rArra^3b^3-16ab^3=ab^3(a^2-16)# now
#a^2-16" is a" color(blue)" difference of squares"# and in general factorises as
# a^2-b^2=(a-b)(a+b)# For
#a^2-16 , a=a " and " b=4→ (a-4)(a+4)#
#rArrcolor(red)(|bar(ul(color(white)(a/a)color(black)(a^3b^3-16ab^3=ab^3(a-4)(a+4))color(white)(a/a)|))#
