We have, f(x)={\begin{matrix}\frac{P(x)}{\mathrm{sin}(x-2)}, \\ 7,\end{matrix}\begin{matrix}x\neq 2 \\ x=2\end{matrix}
P"(x)= Constant
⇒P(x) is a 2 degree polynomial
Let P(x)=(x−2)(ax+b)
f(x) is continuous at x=2
f(2+)=f(2−)
Now, x→2+limsin(x−2)P(x)=7
⇒x→2+limsin(x−2)(x−2)(ax+b)=7
⇒2a+b=7
⇒P(3)=(3−2)(3a+b)=9
⇒3a+b=9
⇒a=2,b=3
Hence, P(5)=(5−2)(2.5+3)
=3.13
=39.