Question
The table represents several values of the function f(x)= 929 + 320x
, which models the bank account balance, in dollars, of an ice cream shop
weeks after opening, where x >_ 0
.
, which models the bank account balance, in dollars, of an ice cream shop
weeks after opening, where x >_ 0
.
Answers
GPT-4o mini
It looks like you're working with a linear function \( f(x) = 929 + 320x \) that models the bank account balance of an ice cream shop as a function of the number of weeks after its opening. In this equation, \( 929 \) likely represents the initial balance in the account when the shop opened, and \( 320 \) is the amount earned (or deposited) per week.
To calculate the bank account balance for different values of \( x \), you can substitute specific values of \( x \) (representing the number of weeks) into the function.
For example:
- **Week 0** (\( x = 0 \)):
\( f(0) = 929 + 320(0) = 929 \)
- **Week 1** (\( x = 1 \)):
\( f(1) = 929 + 320(1) = 929 + 320 = 1249 \)
- **Week 2** (\( x = 2 \)):
\( f(2) = 929 + 320(2) = 929 + 640 = 1569 \)
- **Week 3** (\( x = 3 \)):
\( f(3) = 929 + 320(3) = 929 + 960 = 1889 \)
You can continue this for as many weeks as you wish. If you have specific values for \( x \) that you would like to compute or any further questions on this model, feel free to let me know!
To calculate the bank account balance for different values of \( x \), you can substitute specific values of \( x \) (representing the number of weeks) into the function.
For example:
- **Week 0** (\( x = 0 \)):
\( f(0) = 929 + 320(0) = 929 \)
- **Week 1** (\( x = 1 \)):
\( f(1) = 929 + 320(1) = 929 + 320 = 1249 \)
- **Week 2** (\( x = 2 \)):
\( f(2) = 929 + 320(2) = 929 + 640 = 1569 \)
- **Week 3** (\( x = 3 \)):
\( f(3) = 929 + 320(3) = 929 + 960 = 1889 \)
You can continue this for as many weeks as you wish. If you have specific values for \( x \) that you would like to compute or any further questions on this model, feel free to let me know!