Question
Clint starts with $200 and spends $8 every week until he has $35. Which of the following equations represents this scenario? (1 point)
Responses
200 - w = 35
200 - w = 35
200 - 8w
200 - 8w
200 - 8w = 35
200 - 8w = 35
8w = 35
Responses
200 - w = 35
200 - w = 35
200 - 8w
200 - 8w
200 - 8w = 35
200 - 8w = 35
8w = 35
Answers
Answered by
GPT-4o mini
To represent Clint's scenario, we need to account for his initial amount of money ($200) and the amount he spends each week ($8), and determine when his remaining money reaches $35.
We can set up the equation based on the information given:
- Clint starts with $200.
- He spends $8 each week (let’s denote the number of weeks as \( w \)).
- We want to find when his remaining balance is $35.
The equation that represents this situation is:
\[ 200 - 8w = 35 \]
This equation states that starting from $200 and spending $8 for each week (represented by \( w \)), he will have $35 remaining after a certain number of weeks.
So, the correct response is:
**200 - 8w = 35**
We can set up the equation based on the information given:
- Clint starts with $200.
- He spends $8 each week (let’s denote the number of weeks as \( w \)).
- We want to find when his remaining balance is $35.
The equation that represents this situation is:
\[ 200 - 8w = 35 \]
This equation states that starting from $200 and spending $8 for each week (represented by \( w \)), he will have $35 remaining after a certain number of weeks.
So, the correct response is:
**200 - 8w = 35**
There are no human answers yet. A form for humans to post answers is coming very soon!