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Compound Interest Compounded Annually

Simple and Compound Interest - Concepts

Simple Interest

Compound Interest Compounded Annually

Compound Interest Different Rates

Compound Interest Time in Fractions

Compound Interest Half Yearly

Compound Interest Quarterly

Inverse Problems on Compound Interest - Principal

Inverse Problems on Compound Interest - Rate

Inverse Problems on Compound Interest Time Period

Problems on Population Growth

Problems on Depreciation

Class - Quantitative Aptitude Proficiency Subjects

Concept Explanation

Compound Interest Compounded Annually

Definition: Compound interest is calculated as a percentage as a total amount a the end of the previous compounding period.

Formula:

First Type: $F_{v} = P_{v}(1 + i )^{n}$ ,

where $F_{v}$ = Future Value

$P_{v}$ = Present Value or Original Amount

$i$ = Annual Interest Rate as a Decimal

$(i + 1)$ = multiplier

n = number of years of investment

Illustration: What will Rs 5000 invested at 8% p.a compound interest amount to after 2 years ?

Solution : An interest rate of 8% indicates that i = 0.08.

For 2 years , n = 2 and so $F_{v} = P_{v}(1 + i )^{n}$ = Rs 5000 $times$ $(1.08)^{2}$ = Rs 5832

Second Type:

To find interest only, we use

Compound interest = $F_{v}$ - $P_{v}$

Illustration: How much interest is earned according to the above example1 .

Solution : interest earned = $ 5832 - $ 5000 = $ 832

now , To Find Compound Interest (CI) when Interest is Compounded Annually:

In such cases where interest is compounded yearly, the interest accrued during the first year is added to the principal and the amount so obtained becomes the principal for the second year. The amount at the end of the second year becomes the principal for the third year, and so on.

Illustration: Find the compound interest on Rs 25000 for 3 years at 6% per annum, compounded annually.

Solution: Principal for the first year = Rs. 25000.

$Interest ;for; the; first; year = frac{25000;X;6;X;1}{100}= Rs. 1500.$

Amount at the end of the first year = 25000 + 1500 = Rs 26500.

Principal for the second year = Rs. 26500.

$Interest ;for; the; second; year = frac{26500;X;6;X;1}{100}= Rs. 1590.$

Amount at the end of the second year = Rs 26500 + 1590 = Rs 28090.

Principal for the third year = Rs 28090.

$Interest ;for; the; third; year = frac{28090;X;6;X;1}{100}= Rs. 1685.40$

Amount at the end of the third year = 28090 + 1685.40 = Rs 29775.40.

Therefore, compound interest = 29775.40 - 25000 = Rs 4775.40.

Compound Interest By Formula:

$Amount= Principalleft [1+frac{Rate}{100} right ] ^{time}$

$Compound ;Interest= Amount- Principal$

For the above example:

Principal = 25000

Rate= 6%

time= 3 years

$Amount= Principalleft [1+frac{Rate}{100} right ] ^{time}$

$Amount= 25000left [1+frac{6}{100} right ] ^{3}$

$= 25000left [1+frac{3}{50} right ] ^{3}$

$= 25000left [frac{53}{50} right ] ^{3}$

$= 25000 X ; frac{53}{50};X; frac{53}{50};X; frac{53}{50}$ $= frac{53;X;53;X; 53}{5}=frac{148877}{5}=29775.4$

Therefore, compound interest = 29775.40 - 25000 = Rs 4775.40.

Sample Questions

(More Questions for each concept available in Login)

Question : 1

Rahul took Rs 1,000 loan for 12 months and it says "5% per annum", how much did Rahul pay back if the interest is compounded annually?
A. 1050	B. 1,126	C. 1,126.33	D. 1,176
Right Option : A
View Explanation

Question : 2

Find the amount at the end of 2 years of Rs.1000 at 4% compounded annually.
A. Rs.1081.50	B. Rs.1081.70	C. Rs.1081.80	D. Rs.1081.60
Right Option : D
View Explanation

Question : 3

A man borrowed Rs. 3125 for CI and it amounted to Rs. 4500 in 2 years. The rate of CI per annum is :
A. 30%	B. 25%	C. 20%	D. 15%
Right Option : C
View Explanation

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Problems On Boats And Stream

Rules For Divisibility

Square and Square Root

Profit Loss and Discount

Simple and Compound Interest

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Mensuration

Surface Area and Volume

Introduction to Trigonometry

Permutation and Combination

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