For continuity at x=5
x→5+limf(x)=x→5−limf(x)=f(5)
⇒x→5+lim(b∣x−π∣+3)=x→5−lima(∣π−x∣+1)=a(5−π)+1
We know that |x|={\begin{matrix}x, & x\geq 0 \\ -x, & x<0\end{matrix}
⇒b(5−π)+3=a(5−π)+1=a(5−π)+1
⇒b(5−π)+3=a(5−π)+1
⇒3−1=a(5−π)−b(5−π)
⇒(a−b)(5−π)=2
⇒a−b=5−π2.