Example 10: Finding the Break-Even Point and the Profit Function Using Substitution

Given the cost function $C\left(x\right)=0.85x+35,000$ and the revenue function $R\left(x\right)=1.55x$, find the break-even point and the profit function.

Solution

Write the system of equations using $y$ to replace function notation. Substitute the expression $0.85x+35,000$ from the first equation into the second equation and solve for $x$. Then, we substitute $x=50,000$ into either the cost function or the revenue function. The break-even point is $\left(50,000,77,500\right)$. The profit function is found using the formula $P\left(x\right)=R\left(x\right)-C\left(x\right)$. The profit function is $P\left(x\right)=0.7x - 35,000$.

Example 11: Writing and Solving a System of Equations in Two Variables

The cost of a ticket to the circus is $25.00 for children and $50.00 for adults. On a certain day, attendance at the circus is 2,000 and the total gate revenue is $70,000. How many children and how many adults bought tickets?

Solution

Let c = the number of children and a = the number of adults in attendance. The total number of people is $2,000$. We can use this to write an equation for the number of people at the circus that day. The revenue from all children can be found by multiplying $25.00 by the number of children, $25c$. The revenue from all adults can be found by multiplying $50.00 by the number of adults, $50a$. The total revenue is $70,000. We can use this to write an equation for the revenue. We now have a system of linear equations in two variables. In the first equation, the coefficient of both variables is 1. We can quickly solve the first equation for either $c$ or $a$. We will solve for $a$. Substitute the expression $2,000-c$ in the second equation for $a$ and solve for $c$. Substitute $c=1,200$ into the first equation to solve for $a$. We find that $1,200$ children and $800$ adults bought tickets to the circus that day.