Chapter 3, Problem 10PT

To determine

To find: The number of manicure and pedicure can be done daily to maximize daily income.

Answer to Problem 10PT

Ms. K should make 12 Manicures and 4 pedicures.

Ms. K daily income is 396 dollars

Explanation of Solution

Given information :

Time allots for manicure = 20 min

Time allots for pedicure = 45 min

No of working hour per day = 7 hrs

No of pedicures each day = 5

Prices for manicure = $18

Prices for pedicure = $45

Calculation :

Suppose $x$ represent the number of manicures and $y$ represent the number of pedicures.

Write the system of constraints for the scenario, both variables must be greater than or equal to zero.

  $\begin{array}{l}20\min =\frac{1}{3}\\ 45\min =\frac{3}{4}\end{array}$

Therefore, the equation is written as follows: Since $y\le 5$ , then;

  $\frac{1}{3}x+\frac{3}{4}y=7$

Multiply both the sides of the equation by 12 as follows:

  $4x+9y=84$

Ms. K can make 5 pedicures maximally, then;

  $$

  $\begin{array}{l}\begin{array}{cc}4x+9\times 5& =84\\ 4x+45& =84\\ 4x& =84-45\\ 4x& =39\end{array}\\ x=9.75\end{array}$

Since $x=9.75$ which means king cannot make 10 manicures.

So change the number of

Pedicures to $y=4,$ then

  $\begin{array}{l}\begin{array}{cc}4x+9\times 4& =84\\ 4x+36& =84\\ 4x& =84-36\end{array}\\ 4x=48\\ x=12\end{array}$

Therefore, Ms. K should make 12. Manicures and 4 pedicures.

Ms. K daily income is calculated as;

  $\begin{array}{cc}12\times 18+4\times 45& =216+180\\ & =396\end{array}$

Therefore, Ms. K daily income is 396 dollars.