Math, asked by Amusingdolphin, 4 months ago

Maria invested ₹ 8,000 in a business. She would be paid interest at 5% per annum compounded annually. Find
(i) The amount credited against her name at the end of the second year.
(ii) The interest for the third year.

Answers

Answered by kasaranenisathw
5

Answer:

Simple Interest

If the principal remains the same throughout the loan period then the interest calculated on this principle is called the simple interest.

 

Principal (P): The original sum of money loaned/deposited. Also known as capital.

Time (T): The duration for which the money is borrowed/deposited.

Rate of Interest (R): The percent of interest that you pay for money borrowed, or earn for money deposited

Simple interest is calculated as

S.I= (P×R×T)/100

Total amount at the end of time period

A=  P + SI

 compound interest.

The time Period after which interest is added each time to form a new principal is called the conversion period and the interest so obtained is called a compound interest.

 

If the conversion period is 1 year then the interest is said to be compounded annually.

 

The main difference between the simple interest and compound interest on a certain sum is that in the case of simple interest the principal remains constant throughout wheras in the case of compound interest it goes on changing periodically.

 

The above formula is the interest compounded annually

A= P(1+r/100)^n

 Compound interest= A-P

 

Where A is the amount ,

P  the principal,

r the rate percent per conversion period and n is the number of conversion 

periods

Answered by ashishc1403
5

Given: P = ₹ 8,000, R = 5% p.a.

and n = 2 years

Hence, interest for the third year = ₹ 441

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