Travis earned $214 for each week of
work. At the end of the year, Travis’s
total income was $10,700. How many
weeks out of the year, did Travis work?
Write an equation to show your answer.
Variables and Functions
Solve problems 1–6.
x 1 2 3 4
y 5 10
Number of
hours worked
1 2 4 6
Pay per hour
x 1 2 3 4 5 6 7
y 4
Leveled
Assistance needed.
Please type your subject in the School Subject box. Any other words are likely to delay responses from a teacher who knows that subject well.
$10700/$214 = # of weeks worked
However, I do not know what problems 1-6 are.
I hope this helps. If not, repost questions with adequate information. Thanks for asking.
1. a
2. d
3. d
2009!!!! This is old
To solve the problem, we can set up an equation using the given information. Let's assume that Travis worked for "n" weeks in the year.
Since Travis earned $214 for each week of work, the total income for "n" weeks can be calculated as follows:
Total income = $214 × n
We also know that Travis's total income at the end of the year was $10,700. So we can set up the equation:
$10,700 = $214 × n
This equation shows that the product of $214 and the number of weeks worked is equal to $10,700.
To find the value of "n" (the number of weeks Travis worked), we can rearrange the equation:
n = $10,700 / $214
Simplifying this calculation:
n = 50
Therefore, Travis worked for 50 weeks out of the year.
In summary, the equation to show the answer is:
$10,700 = $214 × n
Where "n" represents the number of weeks Travis worked, and the solution to the equation is n = 50.