Given, f(g(x)=8x2−2xand g(f(x)=4x2+6x+1
Let f(x)=cx2+dx+e and g(x)=ax+b
So, f(g(x))=c(ax+b)2+d(ax+b)+e=8x2−2x
and g(f(x))=a(cx2+dx+e)+b=4x2+6x+1
On comparing both side we get, a=2,b=−1,c=2,d=3,e=1
So, g(x)=2x−1⇒g(2)=3
&f(x)=2{x}^{2}+3x+1
f(2)=8+6+1=15.
So, f(2)+g(2)=18