We describe a savings account with continuous withdrawals that eams interest compounded continuously. Let denote the money in the account, years after it was open. Find the differential
equation and initial condition that satisfies.
Initial amount , annual interest rate , withdrawals at the rate of per month
The differential equation is and the initial condition is .

Ask by Santiago Hampton. in the United States

Mar 23,2025

Question

We describe a savings account with continuous withdrawals that eams interest compounded continuously. Let denote the money in the account, years after it was open. Find the differential
equation and initial condition that satisfies.
Initial amount , annual interest rate , withdrawals at the rate of per month
The differential equation is and the initial condition is .

Ask by Santiago Hampton. in the United States

Mar 23,2025

UpStudy AI · Accepted Answer

We are given:
- Interest is compounded continuously with rate $$0.02$$.
- Withdrawals are made continuously at a rate of \$500 per month. Since there are 12 months in a year, the annual withdrawal rate is
$$
500 \times 12 = 6000.
$$
- The initial deposit is \$11,000.

Since the interest accrues continuously at a rate proportional to the current amount $$ y(t) $$, the contribution from interest is
$$
0.02y(t).
$$
The continuous withdrawals represent a constant decrease of \$6000 per year.

Thus, the differential equation that models the change in the account balance is
$$
y'(t)=0.02y(t)-6000,
$$
with the initial condition
$$
y(0)=11000.
$$
The differential equation is $$ y' = 0.02y - 6000 $$, and the initial condition is $$ y(0) = 11000 $$.

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