What equation represent how much money Judy will have in total after saving for d days?___
What equation represents how much money Elenore will have in total after saving for d days?_____
What equation would be used to find out how many days it will take for Judy and Elenore to have the same amount of money saved? ______
After the number of days it took both to have the same amount of money saved, how much money do they have each?_____
To answer these questions, we need some additional information such as the amount of money Judy and Elenore save per day and their initial savings. Please provide these details so I can give you the accurate equations and answers.
To answer these questions, we would need specific information about Judy and Elenore's saving habits and the amount they save each day. Without this information, we cannot provide specific equations or calculate the exact amounts. The equations would depend on factors like the initial amount they had, the amount they save per day or any other savings patterns they may have.
For example, if Judy saves $10 per day and Elenore saves $15 per day, then their equations could be:
1. Judy's equation: total savings = $10 * d
2. Elenore's equation: total savings = $15 * d
To find out how many days it will take for them to have the same amount of money saved, we would set the two equations equal to each other and solve for d.
3. $10 * d = $15 * d (equating the two equations)
After solving for d and finding the number of days it takes, we can substitute that value back into either Judy's or Elenore's equation to find out how much money they each have saved at that point.
To answer these questions, we can use the formulas provided. Let's break it down step by step:
1. The equation that represents how much money Judy will have in total after saving for d days can be expressed as:
Total Money Saved by Judy = (Amount Saved per Day) x (Number of Days)
This equation assumes Judy saves the same amount of money each day.
2. Similarly, the equation that represents how much money Elenore will have in total after saving for d days can be expressed as:
Total Money Saved by Elenore = (Amount Saved per Day) x (Number of Days)
Again, this equation assumes Elenore saves the same amount of money each day.
3. To find out how many days it will take for Judy and Elenore to have the same amount of money saved, we need to set their total savings equal to each other and solve for d:
(Amount Saved per Day by Judy) x (Number of Days) = (Amount Saved per Day by Elenore) x (Number of Days)
Simplifying this equation will give us the number of days needed for both to have the same savings.
4. After determining the number of days it takes for them to have the same amount saved, we can use either of the previously mentioned equations (equations for Judy and Elenore's total savings) to find out how much money they have. Plug in the calculated number of days into the respective equation to get the total savings for each individual.
It's important to note that the above equations assume the amount saved per day remains constant and do not consider any additional factors such as interest or changing savings rates.