Answer :
Let’s break down the problem step-by-step to find the price of one shirt before tax was added.
1. Total Cost and Tax:
The football coach spent a total of [tex]$890, which includes $[/tex]50 in tax.
2. Total Cost Excluding Tax:
To find out how much was spent on the shirts themselves (excluding tax), we subtract the tax from the total cost:
[tex]\[ \text{Total Cost Excluding Tax} = \text{Total Cost} - \text{Tax} \][/tex]
Substitute the values:
[tex]\[ 890 - 50 = 840 \][/tex]
So, the total cost excluding tax is [tex]$840. 3. Number of Shirts: The coach bought 35 shirts in total. 4. Cost Per Shirt Before Tax: To find the price of one shirt before tax, we divide the total cost excluding tax by the number of shirts: \[ \text{Price Per Shirt Before Tax} = \frac{\text{Total Cost Excluding Tax}}{\text{Number of Shirts}} \] Substitute the values: \[ \frac{840}{35} = 24 \] Therefore, the price of one shirt before tax was $[/tex]24.0.
1. Total Cost and Tax:
The football coach spent a total of [tex]$890, which includes $[/tex]50 in tax.
2. Total Cost Excluding Tax:
To find out how much was spent on the shirts themselves (excluding tax), we subtract the tax from the total cost:
[tex]\[ \text{Total Cost Excluding Tax} = \text{Total Cost} - \text{Tax} \][/tex]
Substitute the values:
[tex]\[ 890 - 50 = 840 \][/tex]
So, the total cost excluding tax is [tex]$840. 3. Number of Shirts: The coach bought 35 shirts in total. 4. Cost Per Shirt Before Tax: To find the price of one shirt before tax, we divide the total cost excluding tax by the number of shirts: \[ \text{Price Per Shirt Before Tax} = \frac{\text{Total Cost Excluding Tax}}{\text{Number of Shirts}} \] Substitute the values: \[ \frac{840}{35} = 24 \] Therefore, the price of one shirt before tax was $[/tex]24.0.