Let the price of rice in April be ₹$ \; x,$ and the price of wheat in April be ₹$ \; y.$
$$\begin{array}{|c|c|c|}\hline \text{Months} & \text{Rice} & \text{Wheat} \\\hline \text{April} & x & y \\\hline \text{May} & 1.2x & 1.12y \\\hline \end{array}$$
Now, $1 . 2x + 1 . 12y = 150 + x + y $
$\Rightarrow \dfrac{12}{10}(450) + 1. 12y = 150 + 450 + y $
$ \Rightarrow 540 + 1 . 12y = 600 + y $
$ \Rightarrow 1 . 12y – y = 600 – 540 $
$ \Rightarrow \frac{12}{100}y = 60 $
$ \Rightarrow 12y = 60 \times 100 $
$ \Rightarrow \boxed{ y = 500} $
So, money spend on wheat in May $ = 1 . 12y = \dfrac{112}{100} \times 500 =$ ₹$560 $
$\therefore$ The money spends on the wheat in May is ₹$560.$
Correct Answer $: \text{C}$