Answer:
Step-by-step explanation:
Represent Ed's savings with e and his sister's by s.
Then the function representing Ed's savings is
e(t) = -$1 + ($6/wk)t, where -$1 is the amount he owes and ($6/wk)t represents the amount he will receive from savings.
The function representing his sister's savings is
s(t) = $2.66 + ($6/wk)t
If we equate these two equations and solve the resulting system for e and s, we'll get:
e(t) = -$1 + ($6/wk)t = s(t) = $2.66 + ($6/wk)t
Then $2.66 + ($6/wk)t Ā = Ā -$1 + ($6/wk)t
Combining like terms results in:
$3.66 = ($6/wk)t, which we solve for t:
Ā Ā Ā $3.66
t = --------------- = 0.61 week, which is equivalent to approx. 4 1/2 days.
Ā Ā Ā ($6/wk)t
The siblings will have the same amount saved after 4 1/2 days, and that amount will be approximately Ā $2.66 + ($6/wk)(0.61 wk) = $6.32
