Difficulty: Medium
Correct Answer: 11 percent
Explanation:
Introduction / Context:
In this problem, the principal and the final amount after 2 years are given, and we need to find the annual compound interest rate. This is a standard reverse compound interest question where you use the relation between amount, principal, rate, and time to solve for the rate of interest.
Given Data / Assumptions:
Concept / Approach:
The compound interest amount formula is:
A = P * (1 + r / 100)^t
Here t = 2, so:
A = P * (1 + r / 100)^2
We are given A and P, so we can solve for (1 + r / 100) and hence for r.
Step-by-Step Solution:
Substitute the values: 12321 = 10000 * (1 + r / 100)^2.
Divide both sides by 10000: 12321 / 10000 = (1 + r / 100)^2.
So (1 + r / 100)^2 = 1.2321.
Note that 1.2321 is equal to 1.11^2 because 1.11 * 1.11 = 1.2321.
Therefore 1 + r / 100 = 1.11.
So r / 100 = 0.11, and r = 11% per annum.
Verification / Alternative Check:
Check by forward computation with r = 11%.
Amount factor = (1.11)^2 = 1.2321.
A = 10000 * 1.2321 = Rs 12321, which matches the given amount.
This confirms that 11% is the correct rate.
Why Other Options Are Wrong:
22 percent would produce a much larger amount over 2 years.
7 percent and 15 percent do not give an amount as high as 12321 when applied to 10000 for 2 years.
Common Pitfalls:
Some learners may forget to take the square root when solving for (1 + r / 100).
Others might incorrectly assume a simple interest relation, which is not appropriate here.
Final Answer:
The required rate of compound interest is 11 percent per annum.
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