1.Let g(x)=(x−1)nlogcosm(x−1)g(x)=\frac{(x-1)^n}{\log\cos^m(x-1)}g(x)=logcosm(x−1)(x−1)n; 0<x<20<x<20<x<2, m,nm,nm,n integers, m≠0m\neq0m=0, n>0n>0n>0 and ppp be the LHD of ∣x−1∣|x-1|∣x−1∣ at x=1x=1x=1. If limx→1+g(x)=p\displaystyle\lim_{x\to1^+}g(x)=px→1+limg(x)=p, thena.n=1,m=1n=1,m=1n=1,m=1b.n=1,m=−1n=1,m=-1n=1,m=−1c.n=2,m=2n=2,m=2n=2,m=2d.n>2,m=nn>2,m=nn>2,m=nLogin to continueOnly logged in users canattempt or see the solution.