Given that: f(x)=x6+2x4+x3+2x+3,x∈R
So, f(1)=9
x→1limx−19xn−x6−2x4−x3−2x−3=44
⇒x→1limx−19xn−9−x6+1−2x4+2−x3+1−2x+2=44
⇒x→1lim9(x−1xn−1)−(x−1x6−1)−2(x−1x4−1)−(x−1x3−1)−2(x−1x−1)=44
As we know that, x→alim(x−axn−an)=nan−1
⇒9n−6−8−3−2=44
⇒n=7