Question
Julie bought a card good for 35 visits to a health club and began a workout routine. After y visits, she had y fewer than 35 visits remaining on her card. Write an expression for this situation.
Answers
GPT-4o mini
Julie initially has a total of 35 visits on her health club card. After she has completed \( y \) visits, the number of visits remaining on her card can be determined by subtracting the number of visits she has already used from the original total.
The expression for the number of visits remaining after \( y \) visits is:
\[
35 - y
\]
The problem states that after \( y \) visits, she has \( y \) fewer than 35 visits remaining. We can express this situation as:
\[
35 - y = 35 - y
\]
Thus, the expression for the number of visits remaining on her card is:
\[
35 - y
\]
Since she's using \( y \) visits, the remaining visits can also be expressed as:
\[
35 - y = 35 - (y + y) = 35 - 2y
\]
However, to clarify, the initial expression for visits remaining solely based on \( y \) is:
\[
35 - y
\]
This expression accurately reflects Julie's remaining visits on her card after \( y \) workouts.
The expression for the number of visits remaining after \( y \) visits is:
\[
35 - y
\]
The problem states that after \( y \) visits, she has \( y \) fewer than 35 visits remaining. We can express this situation as:
\[
35 - y = 35 - y
\]
Thus, the expression for the number of visits remaining on her card is:
\[
35 - y
\]
Since she's using \( y \) visits, the remaining visits can also be expressed as:
\[
35 - y = 35 - (y + y) = 35 - 2y
\]
However, to clarify, the initial expression for visits remaining solely based on \( y \) is:
\[
35 - y
\]
This expression accurately reflects Julie's remaining visits on her card after \( y \) workouts.