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HP 12C Calculator: Amortization Schedules and Loan Payments, Notas de estudo de Engenharia Mecânica

Instructions on how to use the hp 12c calculator to generate amortization schedules for various types of loans. It includes examples of calculating the first, second, and subsequent years of loan payments for a mortgage and a car loan. The concept of amortization and how the hp 12c calculator applies it to loan calculations.

Tipologia: Notas de estudo

Antes de 2010

Compartilhado em 14/11/2010

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HP 12C Loan Amortizations
Amortization
The HP12C amortization approach
Practice amortizing loans
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HP 12C Loan Amortizations

Amortization

The HP12C amortization approach

Practice amortizing loans

HP 12C Loan Amortizations

Amortization

The word 'amortization' comes from a Latin word meaning "about to die". When a loan earning interest has regular, fixed payments, it is said that the loan is being paid off or amortized. Although the debt is reduced by the same periodic payments, different parts of each payment are applied against the principal and against the interest. The interest is deduced from each payment and the remaining amount is used to reduce the debt. Figure 1 illustrates this process.

Figure 1

The HP12C amortization approach

In the HP12C, amortization uses the contents of the following Time Value of Money (TVM) registers:

n - used as a reference and contains the number of payments amortized ¼ - periodic interest rate P - periodic payment $ - remaining balance

The display must contain the number of payments to be amortized before executing f!. It is important to keep in mind that on the HP12C, amortization is a sequenced calculation. This means that once a number of payments is amortized, all subsequent balances refer to the next amortized payments. If it is necessary to go back and review previous balance, some values must be restored to their default values. This is because every time f! is pressed, the following registers have their contents updated:

$ - contents updated to remaining balance n - contents updated to current number of payments amortized

The following examples illustrate the HP12C amortization approach.

Practice amortizing loans

Example 1: Calculate the first year of the annual amortization schedule for a 30-year, $180,000 mortgage at 7.75%, compounded monthly.

1 2 3................... n

Number of payments

Periodic Payment (fixed value)

Part of each payment related to interest

Part of each payment related to the principal

HP 12C Loan Amortizations

Now it is necessary to input the number of payments to be amortized. In this example, twelve more payments must be amortized to calculate the second year:

12 f!

Figure 7

This is the total interest paid after two years. To see the part of the principal that is paid, press:

Figure 8

To check the loan balance after one year, press:

Figure 9

Answer: After two years, the loan balance is $176,713.49. The amount of principal repaid is $1,706.69 and the amount of interest paid is $13,767.79.

Example 3: Amortize the 10th^ payment of a 4-year car loan. The loan amount is $12,500 and the interest rate is 10.2%, compounded monthly. Assume monthly payments starting immediately.

Solution: Clear the TVM registers contents to zero and set BEGIN mode:

fG g×

Set the relevant TVM values and calculate PMT:

10.2 gC 4 gA 12500 $ 0 M P

Figure 10

To amortize the 10th^ payment it is necessary to amortize the first nine payments and then amortize the 10th separately:

0 n 9 f! 1 f!

HP 12C Loan Amortizations

Figure 11

This is the interest paid with the 10th^ payment. To see the part of the principal that is paid:

Figure 12

To check the loan balance after ten payments:

Figure 13

Answer: After ten payments, the loan balance is $10,210.45. With the 10 th^ payment, the amount of principal that has been paid is $226.83 and $88.72 interest has been paid.

Example 4: With all data from the previous example still available in the calculator memory, amortize the 22 nd^ payment.

Solution: Just to verify the calculator is still in the proper state, recall the contents of n to the display:

:n

Figure 14

To amortize the 22nd^ payment it is necessary to amortize the next eleven payments and then amortize the 22 nd^ separately:

11 f! 1 f!

Figure 15

This is the interest paid with the 22nd^ payment. To see the part of the principal that is paid:

Figure 16