What is the standard form of # y= (5x+3)^3+(7x-13)^2#?
1 Answer
Jan 18, 2017
Explanation:
In general we have:
#(a+b)^2 = a^2+2ab+b^2#
#(a+b)^3 = a^3+3a^2b+3ab^2+b^3#
So:
#(7x-13)^2 = (7x)^2-2(7x)(13)+13^2#
#color(white)((7x-13)^2) = 49x^2-182x+169#
#(5x+3)^3 = (5x)^3+3(5x)^2(3)+3(5x)(3^2)+3^3#
#color(white)((5x+3)^3) = 125x^3+225x^2+135x+27#
So:
#(5x+3)^3+(7x-13)^2#
#= 125x^3+225x^2+135x+27 + 49x^2-182x+169#
#= 125x^3+(225+49)x^2+(135-182)x+(27+169)#
#= 125x^3+274x^2-47x+196#
