Judy has $100 and Elenore has $75. Judy is saving $5 per day and Elenore is saving $7 per day.
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?_____
1) The equation representing how much money Judy will have in total after saving for d days is: 100 + 5d.
2) The equation representing how much money Elenore will have in total after saving for d days is: 75 + 7d.
3) The equation to find out how many days it will take for Judy and Elenore to have the same amount of money saved is: 100 + 5d = 75 + 7d.
4) After the number of days it took both to have the same amount of money saved, the amount of money they each have can be found by substituting the value of d into either equation.
To calculate how much money Judy will have in total after saving for d days, we start with her initial amount ($100) and add the amount she saves each day ($5) multiplied by the number of days (d):
Total money Judy will have = $100 + ($5 * d)
To calculate how much money Elenore will have in total after saving for d days, we start with her initial amount ($75) and add the amount she saves each day ($7) multiplied by the number of days (d):
Total money Elenore will have = $75 + ($7 * d)
To find out how many days it will take for Judy and Elenore to have the same amount of money saved, we set their total money equations equal to each other and solve for d:
$100 + ($5 * d) = $75 + ($7 * d)
After solving for d, we find the number of days it takes for Judy and Elenore to have the same amount of money saved.
After the number of days it took for both Judy and Elenore to have the same amount of money saved, we can substitute that value of d into either Judy or Elenore's total money equation to find out how much money they each have.
To find the equation that represents how much money Judy will have in total after saving for d days, we need to consider that Judy saves $5 per day. So, for each day, her savings will increase by $5. Since Judy starts with $100, her total savings after d days can be represented by the equation:
Total savings for Judy = $100 + ($5 x d)
To find the equation that represents how much money Elenore will have in total after saving for d days, we need to consider that Elenore saves $7 per day. So, for each day, her savings will increase by $7. Since Elenore starts with $75, her total savings after d days can be represented by the equation:
Total savings for Elenore = $75 + ($7 x d)
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. So, the equation would be:
$100 + ($5 x d) = $75 + ($7 x d)
Once we solve this equation and find the value of d, we can substitute that value back into the total savings equations for Judy and Elenore to calculate their savings at that point.
After the number of days it took both Judy and Elenore to have the same amount of money saved, we can substitute that value (d) into their respective total savings equations. This will give us the amount of money each of them has at that point.
what 4??
To calculate how much money Judy will have in total after saving for d days, we start with her initial amount ($100) and add the amount she saves each day ($5) multiplied by the number of days (d):
Total money Judy will have = $100 + ($5 * d)
To calculate how much money Elenore will have in total after saving for d days, we start with her initial amount ($75) and add the amount she saves each day ($7) multiplied by the number of days (d):
Total money Elenore will have = $75 + ($7 * d)
To find out how many days it will take for Judy and Elenore to have the same amount of money saved, we set their total money equations equal to each other and solve for d:
$100 + ($5 * d) = $75 + ($7 * d)
After solving for d, we find the number of days it takes for Judy and Elenore to have the same amount of money saved.
After the number of days it took for both Judy and Elenore to have the same amount of money saved, we can substitute that value of d into either Judy or Elenore's total money equation to find out how much money they each have.
the opices are $275, $162.50, $325, $15, $175
It seems that the numbers you provided are not relevant to the given scenario about Judy and Elenore's savings. Can you please provide the correct numbers or clarify your question?
my question is After the number of days it took both to have the same amount of money saved, the amount of money they each have can be found by substituting the value of d into either equation. what the ansewr?
$275 or $162.50 or $325 or $15 or $175
To find the amount of money they each have after the number of days it took for them to have the same amount saved, you need to substitute the value of d into either Judy or Elenore's total savings equation. Since we don't know the value of d, we cannot determine the specific amount of money they would each have.
To find the value of d, we need to solve the equation we established earlier: $100 + ($5 * d) = $75 + ($7 * d). By solving this equation, we can determine the number of days it takes for Judy and Elenore to have the same amount saved. Once we have the value of d, we can substitute it into either Judy or Elenore's total savings equation to find out the amount of money they each have.