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LESSON 4

LESSON 4. BASICS OF SIMPLE INTEREST. Learning Outcomes. By the end of this lesson, students should be able to: Calculate simple interest. Calculate maturity value. Calculate the exact number of days from one date to another in a loan period. Find the due date of a loan.

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LESSON 4

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  1. LESSON 4 BASICS OF SIMPLE INTEREST

  2. Learning Outcomes • By the end of this lesson, students should be able to: • Calculate simple interest. • Calculate maturity value. • Calculate the exact number of days from one date to another in a loan period. • Find the due date of a loan. • Find the exact and ordinary interest. • Find the principal, rate and time of the simple interest. • Define the basic terms used with promissory notes.

  3. List of Topics • 3.1 Calculate simple interest • 3.2 Calculate maturity value • 3.3 Calculate the exact number of days from one date to another in a loan period • 3.4 Find the due date of a loan • 3.5 Find the exact and ordinary interest • 3.6 Find the principal, rate, and time of the simple interest • 3.7 Define the basic terms used with promissory notes

  4. Simple interest • Interest is a fee charged for borrowing money or returns on investment or savings in financial institutions. There are two types of interest commonly used nowadays: simple interest and compound interest. Simple interest involves interest only on the principal, while compound interest requires interest to be paid on both principal and the previously earned interest. For this topic, discussion will be on simple interest only. • Simple interest is interest charged or returns on the entire principal for the entire length of the loan.

  5. Interest = Principal x Rate x Time I =PRT Where: • I – Interest, the amount charged or earned for any loan or deposit. • P – Principal, either the loan amount or the amount invested. • R – Rate, the percent charged for borrowing money or percent earned for investment. • T – Time, the loan period or investment period written in terms of number of years. • If it is written in terms of month/week/day, convert it to a fraction of a year. • For example, 3 months loan, will be written as 3/12

  6. Example • Calculate the interest earned from an investment of RM 20,000 at 6% invested for two months • Solution: I =PRT 20,000 X 0.06 X 2/12 = RM 200

  7. Maturity value • The maturity value It is the total value of a loan or an investment. The total value is the principal plus the interest. Maturity value is the amount that must be repaid when the loan is due, or total amount earned at the end of the investment period. Maturity value = Principal + Interest M =P +I

  8. Example • Find the maturity value of a RM 80,000 loan borrowed for three months at 6%. • The interest charged I =PRT 80,000 X 0.06 X 3/12 = RM1,200 The maturity value of the loan = RM80,000 + 1, 200 = RM81,200

  9. Computing the exact number of days from one date to another in a loan period • It is common for loans to be given in certain number of days, such as 90 days or 120 days from a given date or a loan may be due on a fixed date such as February 24. • In applying the I = PRT formula, we need to find the number of days from one date to another by referring to the number of each day of the year table.

  10. Example • Find the number of days from February 10 to August 25 • Solution: • Find 10 at the leftmost column of the number of each day of the year table. • Go across that row until it intersects with the column headed by February. • The number of that intersection is 41, meaning that February 10 is on the 41st day of the year. • Next find August 25, which is 237th day of the year. • Deduct the difference in day of the year to find the number of days in the loan period: • August 25 is day 237 • February 10 is day -41 • = 196

  11. Find the due date of a loan • There are cases where the loan is due in a certain number of days. If the date the loan is given is known, then the date it is due can also be found by using the number of each day of the year table • Example • Date loan was made: Jan 3, Term of loan: 100 days. When is the due date of the loan? • Solution • (Jan 3) 3 + 100 days = 103 • Refer to table for day 103. The due date is April 13.

  12. Exact and ordinary interest • When time period is in days, instead of year or months, there are two methods commonly used to calculate time (for Time in Interest formula). • Exact interest - uses 365 as the number of days in a year. • Ordinary interest or banker’s interest - uses 360 as the number of days in a year. • Financial institutions usually use ordinary interest as it produces more interest.

  13. solution

  14. Find the interest earned from RM 61,000 investment made by Aisyah for 150 days at 12%. Calculate using both the exact interest and ordinary interest.

  15. Finding of the principal, rate and time of the simple interest • This section explains the use of I = PRT in different forms. It is used to calculate principal, rate or time, given either interest or any of the other two values is known. • Finding the principal. • When interest, rate, and time are known, the principal can be computed using the following formula

  16. Finding the principal. Principal =

  17. Example • Calculate the principal of a 6% note that earned RM 160 in 60 days.

  18. Finding the rate Rate =

  19. Example The rate is 9%.

  20. Finding the time Time =

  21. Example • Find the time, stated in years; it will take a RM 6,000 loan to earn RM 400 interest at a 5% rate. • Solution:

  22. Promissory note • It is a written promise to pay a certain sum of money on a specific future date by one person or firm to another person or firm. It is a legal document between lender and borrower. • Some promissory notes are non-interest-bearing. The borrower pays back only the amount borrowed at maturity. However, most notes are interest bearing. • The following is an example of an interest-bearing note:

  23. Promissory note

  24. The above promissory note is called interest bearing promissory note. It is a legal document that promises to pay a certain amount of money at a determined future date. • Below are the terms of a simple interest promissory note. • Maker : Danish Mohamad • Payer : Asma’ Abu Bakar • Payee : Asma’ Abu Bakar • Face value : RM 750.00 • Term of loan (Length of time until the note is due) : 90 days • Date loan was made : October 27, 2005 • Date loan is due : January 25, 2006 • Maturity value (Principal + interest) : RM 772.50 • Calculation for interest charged and maturity value of the note are shown below

  25. Lesson Summary • This topic explains the method of calculating simple interest. It is a one-time interest charged to the entire principal. It uses the formula . Students are also introduced to the interest bearing promissory notes and the calculations involved. • Next topic would cover lessons on discounting promissory notes before its maturity. Students must have good understanding of simple interest as prerequisite for understanding the next topic.

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