Jane will have $50 + ($4 * d) after saving for d days.
Therefore, the equation representing how much money Jane will have in total after saving for d days is:
Total money = $50 + ($4 * d)
What equation represents how much money Jane will have in total after saving for d days?
Therefore, the equation representing how much money Jane will have in total after saving for d days is:
Total money = $50 + ($4 * d)
Therefore, the equation representing how much money Ellis will have in total after saving for d days is:
Total money = $24 + ($6 * d)
Therefore, Jane will have saved $50 + ($4 * d) and Ellis will have saved $24 + ($6 * d) after d days.
So, the equation would be:
$50 + ($4 * d) = $24 + ($6 * d)
Simplify the equation and solve for d to find the number of days it will take for Jane and Ellis to have the same amount of money saved.
50 + 4d = 24 + 6d
After the amount of time found above, how much will Jane and Ellis each have saved?
50 + 4d = 24 + 6d
Subtracting 4d from both sides:
50 = 24 + 2d
Subtracting 24 from both sides:
26 = 2d
Dividing by 2:
d = 13
So, it will take 13 days for Jane and Ellis to have the same amount of money saved.
After 13 days, Jane will have saved:
$50 + ($4 * 13) = $50 + $52 = $102
After 13 days, Ellis will have saved:
$24 + ($6 * 13) = $24 + $78 = $102
Therefore, after 13 days, both Jane and Ellis will have saved $102 each.