Answer:
Deduction in the step-by-step explanation
Step-by-step explanation:
If a P0=50.000 deposit is compound every instant, the ammount in the account can be modeled as:
[tex]P(t) = P_{0}*e^{it}[/tex]
If you pull out d dollars a year, the equation becomes:
[tex]P(t) = P_{0}*e^{it}-d*t[/tex]
If we derive this equation in terms of t, we have
[tex]P(t) = P_{0}*e^{it}-d*t\\dP/dt=d(P_{0}*e^{it})/dt-d(d*t)/dt\\dP/dt=i*P_{0}*e^{it}-d\\[/tex]
The first term can be transformed like this:
[tex]i*P_{0}*e^{it} = i*P(t)[/tex]
So replacing in the differential equation, we have
[tex]dP/dt=i*P_{0}*e^{it}-d\\dP/dt=i*P(t)-d[/tex]
Rearranging
[tex]dP/dt-i*P(t)=-d[/tex]
