The following information is available for a bank account:
Date | Deposits | Withdrawals | Balance |
5/1 |
|
| 1512.33 |
| 220.13 | 327.26 |
|
6/1 |
|
|
|
| 216.80 | 378.61 |
|
7/1 |
|
|
|
| 450.25 | 106.80 |
|
8/1 |
|
|
|
| 127.31 | 350.61 |
|
9/1 |
|
|
|
Note that the money earns interest which is computed as
Interest = i Bi
where i = the interest rate expressed as a fraction per month and Bi the initial balance at the beginning of the month.
(a) Use the conservation of cash to compute the balance on 6/1, 7/1, 8/1, and 9/1 if the interest rate is 1% per month (i = 0.01/month). Show each step in the computation.
(b) Write a differential equation for the cash balance in the form
where t = time (months), D(t) = deposits as a function of time ($/month), W(t) = withdrawals as a function o time ($/month). For this case, assume that interest is compounded continuously; that is, interest = iB.
(c) Use Euler’s method with a time step of 0.5 month to simulate the balance. Assume that the deposits and with drawals are applied uniformly over the month.
(d) Develop a plot of balance versus time for (a) and (c).
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