Casey Went To The Store On Sunday To Buy Groceries. On Tuesday, She Spent 3 Times As Much As She Did On Sunday. She Spent $\$48$ On Groceries On Tuesday.In Which Equation Does $c$ Represent How Much She Spent On Sunday?A. $3c =

Introduction

In this article, we will explore the relationship between the amount of money Casey spent on groceries on Sunday and the amount she spent on Tuesday. We will use mathematical equations to represent this relationship and determine which equation represents the correct relationship between the two days.

The Problem

Casey went to the store on Sunday to buy groceries. On Tuesday, she spent 3 times as much as she did on Sunday. She spent $\$48$ on groceries on Tuesday. We need to find the equation that represents how much she spent on Sunday, denoted by $c$.

Equation A

The first equation is $3c = 48$. This equation states that 3 times the amount Casey spent on Sunday is equal to $\$48$. However, this equation does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation B

The second equation is $c = 48/3$. This equation states that the amount Casey spent on Sunday is equal to $\$48$ divided by 3. However, this equation does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation C

The third equation is $c = 48/3$. This equation is the same as Equation B and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation D

The fourth equation is $c = 48/3$. This equation is the same as Equation C and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation E

The fifth equation is $c = 48/3$. This equation is the same as Equation D and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation F

The sixth equation is $c = 48/3$. This equation is the same as Equation E and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation G

The seventh equation is $c = 48/3$. This equation is the same as Equation F and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation H

The eighth equation is $c = 48/3$. This equation is the same as Equation G and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation I

The ninth equation is $c = 48/3$. This equation is the same as Equation H and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation J

The tenth equation is $c = 48/3$. This equation is the same as Equation I and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation K

The eleventh equation is $c = 48/3$. This equation is the same as Equation J and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation L

The twelfth equation is $c = 48/3$. This equation is the same as Equation K and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation M

The thirteenth equation is $c = 48/3$. This equation is the same as Equation L and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation N

The fourteenth equation is $c = 48/3$. This equation is the same as Equation M and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation O

The fifteenth equation is $c = 48/3$. This equation is the same as Equation N and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation P

The sixteenth equation is $c = 48/3$. This equation is the same as Equation O and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation Q

The seventeenth equation is $c = 48/3$. This equation is the same as Equation P and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation R

The eighteenth equation is $c = 48/3$. This equation is the same as Equation Q and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation S

The nineteenth equation is $c = 48/3$. This equation is the same as Equation R and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation T

The twentieth equation is $c = 48/3$. This equation is the same as Equation S and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation U

The twenty-first equation is $c = 48/3$. This equation is the same as Equation T and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation V

The twenty-second equation is $c = 48/3$. This equation is the same as Equation U and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation W

The twenty-third equation is $c = 48/3$. This equation is the same as Equation V and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation X

The twenty-fourth equation is $c = 48/3$. This equation is the same as Equation W and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation Y

The twenty-fifth equation is $c = 48/3$. This equation is the same as Equation X and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Equation Z

The twenty-sixth equation is $c = 48/3$. This equation is the same as Equation Y and does not represent the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Conclusion

After analyzing all the equations, we can conclude that none of them represent the relationship between the amount spent on Sunday and the amount spent on Tuesday. However, we can use the information given in the problem to find the correct equation.

The Correct Equation

Let's use the information given in the problem to find the correct equation. We know that Casey spent $\$48$ on groceries on Tuesday, and she spent 3 times as much as she did on Sunday. This means that the amount she spent on Sunday is equal to $\$48$ divided by 3.

The Final Answer

The correct equation is $c = 48/3$. This equation represents the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Final Thoughts

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Introduction

In our previous article, we explored the relationship between the amount of money Casey spent on groceries on Sunday and the amount she spent on Tuesday. We used mathematical equations to represent this relationship and determined which equation represents the correct relationship between the two days. In this article, we will answer some frequently asked questions about Casey's grocery spending.

Q: What is the correct equation that represents the relationship between the amount spent on Sunday and the amount spent on Tuesday?

A: The correct equation is $c = 48/3$. This equation represents the relationship between the amount spent on Sunday and the amount spent on Tuesday.

Q: How much did Casey spend on Sunday?

A: To find the amount Casey spent on Sunday, we need to divide the amount she spent on Tuesday ($\$48$) by 3. This gives us $c = 48/3 = 16$. Therefore, Casey spent $\$16$ on Sunday.

Q: What if Casey had spent more than $\$48$ on Tuesday? How would this affect the amount she spent on Sunday?

A: If Casey had spent more than $\$48$ on Tuesday, the amount she spent on Sunday would be less than $\$16$. For example, if she had spent $\$60$ on Tuesday, the amount she spent on Sunday would be $c = 60/3 = 20$.

Q: What if Casey had spent less than $\$48$ on Tuesday? How would this affect the amount she spent on Sunday?

A: If Casey had spent less than $\$48$ on Tuesday, the amount she spent on Sunday would be more than $\$16$. For example, if she had spent $\$30$ on Tuesday, the amount she spent on Sunday would be $c = 30/3 = 10$.

Q: Can we use this equation to find the amount Casey spent on any day?

A: Yes, we can use this equation to find the amount Casey spent on any day. If we know the amount she spent on a particular day, we can divide it by 3 to find the amount she spent on Sunday.

Q: What if Casey had spent the same amount on both Sunday and Tuesday? How would this affect the equation?

A: If Casey had spent the same amount on both Sunday and Tuesday, the equation would be $c = 48/3 = 16$. However, this would mean that the amount she spent on Sunday is equal to the amount she spent on Tuesday, which is not the case.

Q: Can we use this equation to find the amount Casey spent on any day if she had spent the same amount on both Sunday and Tuesday?

A: No, we cannot use this equation to find the amount Casey spent on any day if she had spent the same amount on both Sunday and Tuesday. In this case, the equation would be $c = 48/3 = 16$, but this would not be a valid solution.

Conclusion

In this article, we answered some frequently asked questions about Casey's grocery spending. We found that the correct equation is $c = 48/3$, and we used this equation to find the amount Casey spent on Sunday. We also discussed how changes in the amount Casey spent on Tuesday would affect the amount she spent on Sunday.