Given that the price of one adult ticket is $$35$ and the price of one child ticket is $$15$.

The total number of tickets sold is $1650$ and the amount collected is $$47,150$.

The objective is to find the number of adult and child tickets sold.

Let the number of adult tickets sold be $x$ and the number of child tickets sold be $y$

The total number of tickets sold is $1650$. So an equation can be formed as

$x+y=1650 ...\left(1\right)$

Now the total cost of $x$ adult tickets each at $$35$ and $y$ child tickets each at $$15$ is $$47,150$. So another equation can be written as

$35x+15y=47150 ...\left(2\right)$

The first equation can be solved for $y$ as

$\begin{array}{rcl}x+y& =& 1650\\ x+y-x& =& 1650-x\\ y& =& 1650-x ...\left(3\right)\end{array}$

So using the third equation substitute $1650-x$ for $y$ in the second equation and solve for data-custom-editor="chemistry" $\mathrm{x}$

$\begin{array}{rcl}35x+15y& =& 47150\\ 35x+15(1650-x)& =& 47150\\ 35x+24750-15x& =& 47150\\ 35x-15x+24750-24750& =& 47150-24750\\ 20x& =& 22400\\ \frac{20x}{20}& =& \frac{22400}{20}\\ x& =& 1120\end{array}$

Substitute $1120$ for $x$ in the third equation and find the value of $y$

$$\begin{gathered} y=1650-x \\ y=1650-1120 \\ y=530 \end{gathered}$$

So the number of adult tickets sold is $1120$

and the number of child tickets sold is $530$.

Substitut$1120$ for $x$ and $530$ for $y$ in the first equation formed.

$\begin{array}{rcl}x+y& =& 1650\\ 1120+530& =& 1650\\ 1650& =& 1650\end{array}$

It is a true statement.

Again, substitute the values in the second equation formed.

$\begin{array}{rcl}35x+15y& =& 47150\\ 35·1120+15·530& =& 47150\\ 39200+7950& =& 47150\\ 47150& =& 47150\end{array}$

This is also a true statement.

So the point satisfies both the equations.