Chapter 1, Problem 1PS

a.

To determine

To write: a linear equation for your current monthly wage $W_1$ in terms of your monthly sales S.

Answer to Problem 1PS

Wage of salesperson is $W_1=0.07S+2000$

Explanation of Solution

Given Information:

As a salesperson, you receive a monthly salary of $2000, plus a commission of 7% of sales. You receive an offer for a new job at $2300 per month, plus a commission of 5% of sales.

Calculation:

Monthly salary = $2000 plus a commission of 7% of sales.

Total Wage is sum of monthly salary and commission.

  $\begin{array}{l}{W}_1=\frac{7}{100}S+2000\\ W_1=0.07S+2000\end{array}$

b.

To determine

To write: a linear equation for the monthly wage $W_2$ of your new job offer in terms of the monthly sales S.

Answer to Problem 1PS

Wage of salesperson from new job $W_2=0.05S+2300$

Explanation of Solution

Given Information:

As a salesperson, you receive a monthly salary of $2000, plus a commission of 7% of sales. You receive an offer for a new job at $2300 per month, plus a commission of 5% of sales. Write

Calculation:

Monthly salary for new job = $2300 plus a commission of 5% of sales.

Total Wage is sum of monthly salary and commission.

  $\begin{array}{l}{W}_2=\frac{5}{100}S+2300\\ W_2=0.05S+2300\end{array}$

c.

To determine

To graph: both equations in the same viewing window and then find the point of intersection also what does the point of intersection represent?

Answer to Problem 1PS

The point of intersection is $\left(15000,3050\right)$

Explanation of Solution

Given iformation:

As a salesperson, you receive a monthly salary of $2000, plus a commission of 7% of sales. You receive an offer for a new job at $2300 per month, plus a commission of 5% of sales. Use a graphical utility to graph Using a graphical utility the graph formed will be

  $\begin{array}{l}{W}_1=0.07S+2000\\ W_2=0.05S+2300\end{array}$

Graph:

Plotting $W_1=0.07S+2000$ and $W_2=0.05S+2300$ using a graphical utility on the same graph or form a table like

  $\begin{array}{l}\begin{array}{cccc}S& 0& 15000& -\frac{200000}{7}\\ W_1& 2000& 3050& 0\end{array}\\ \begin{array}{cccc}S& 0& 15000& -46000\\ W_2& 2300& 3050& 0\end{array}\end{array}$

Plot the points and join them

  

The point of intersection is $\left(15000,3050\right)$

d.

To determine

To Find: whether to change job or not when expected sale is $20,000 per month.

Answer to Problem 1PS

  $W_1>W_2$ , So don't change the job.

Explanation of Solution

Given Information:

As a salesperson, you receive a monthly salary of $2000, plus a commission of 7% of sales. You receive an offer for a new job at $2300 per month, plus a commission of 5% of sales

Calculation:

Expected sale is of $20,000 per month.

From part (a), we have $W_1=0.07S+2000$ and

From part (b), we have $W_2=0.05S+2300$

Now, putting $S=20000$ in $W_1\&W_2$ , we get

  $\begin{array}{c}{W}_1=0.07\left(20000\right)+2000\\ =1400+2000\\ =3400\\ W_2=0.05\left(20000\right)+2300\\ =1000+2300\\ =3300\end{array}$

Here $W_1=3400$ and $W_2=3300$ , So $W_1>W_2$

That implies no need to change the job; you get more money from your current job.