The store employee works 35 hours per week. Which inequality can be used to find the dollar value, x, of weekly sales that the employee must make to earn more than $400 per week?
To find the inequality that represents the minimum dollar value of weekly sales, x, that the employee must make to earn more than $400 per week, we need to consider the employee's hourly wage and the number of hours worked. Let's break down the steps:
Step 1: Determine the employee's hourly wage.
If we know the employee's total earnings for the week, and assuming the hourly wage remains constant, we can calculate the hourly wage. However, the hourly wage information is not provided in the question. Therefore, we cannot find an exact value for the hourly wage.
Step 2: Calculate the weekly earnings.
Since the employee works 35 hours per week, let's assume we know the hourly wage is represented by the letter 'w.' We can write the formula for weekly earnings as:
Weekly Earnings = (Number of hours worked per week) x (Hourly wage)
Weekly Earnings = 35w
Step 3: Set up the inequality.
We want to find the minimum dollar value, 'x,' for weekly sales that allows the employee to earn more than $400 per week. Therefore, we need to form an inequality.
Weekly Earnings > $400
35w > $400
So, the inequality that can be used to find the dollar value, x, of weekly sales that the employee must make to earn more than $400 per week is 35w > $400.
To find the inequality that represents the dollar value, x, of weekly sales that the employee must make to earn more than $400 per week, we can set up the inequality as follows:
x > 400
Therefore, the inequality is x > 400.