Carl Carpenter buys a drill press. The price, including tax, is $725.00. He finances the drill press over 24 months after making a $50 down payment. The true annual interest rate is 14%. What are Carl's monthly payments (principal plus interest)? Amount of Interest to the nearest penny, c = $ . Total of payments = amount financed + c = $ . Total of payments ÷ number of payments = monthly payment = $

First calculate the amount financed
Amount financed=725−50=675

The formula is
I=(2yc)/(m (n+1))
Solve for c to get
C=(I×m×(n+1))/2y
C=(0.14×675×(24+1))÷(2×12)=98.44

Total of payments=675+98.44=773.44

Monthly payment is
773.44÷24=32.23

Hope it helps!

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slicergiza slicergiza · Answer 2 · 2019-11-14T10:37:31+01:00

Answer:

Total payment = $ 773.44

Monthly payment = $ 32.23

Amount of Interest = $ 98.44

Explanation:

Given,

The total price = $725.00,

Down payment = $ 50,

So, the amount financed = 725 - 50 = $ 675,

Since, true interest formula,

[tex]I=\frac{2yc}{m(n+1)}[/tex]

Where,

y = payments per year,

c = total interest paid,

m = amount financed,

n = total number of payment,

Here, y = 12, I = 14% = 0.14, m = $ 675, n = 24,

By substituting the values,

We get,

[tex]0.14=\frac{2\times 12\times c}{675(24+1)}[/tex]

[tex]0.14 = \frac{24c}{675(25)}[/tex]

[tex]\implies c = \frac{0.14\times 16875}{24}=\frac{2362.5}{24}\approx 98.44[/tex]

Thus, amount of interest, c = $ 98.44,

Total of payments = m + c = 675 + 98.44 = $ 773.44,

Also,

[tex]\text{Monthly payment}=\frac{\text{Total of payments}}{\text{Number of payments}}[/tex]

[tex]=\frac{773.44}{24}[/tex]

= $ 32.23