Given, $n$ coins have head on both the sides
and $(n+1)$ coins are fair coins.
Total coins $=2 n+1$
Let events $E_1, E_2$ be the following
$E_1=$ Event that an unfair coin is selected
$E_2=$ Event that a fair coin is selected
$\therefore \quad P\left(E_1\right)=\frac{n}{2 n+1}$ and $P\left(E_2\right)=\frac{n+1}{2 n+1}$
From the law of total probability,
$\therefore \quad P(E)=P\left(E_1\right) \times P\left(\frac{E}{E_1}\right)+P\left(E_2\right) \times P\left(\frac{E}{E_2}\right)$
$\begin{array}{ll}\Rightarrow \quad & \frac{31}{42}=\frac{n}{2 n+1} \times 1+\frac{n+1}{2 n+1} \times \frac{1}{2} \\ \Rightarrow \quad & \frac{31}{42}=\frac{2 n+n+1}{2(2 n+1)} \\ \Rightarrow & 31 \times 2(2 n+1)=42(3 n+1) \\ \Rightarrow & 124 n+62=126 n+42 \\ \Rightarrow & 2 n=20 \\ & n=10\end{array}$