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A principal P becomes Qin 1 year when compounded half-yearly with R% annual rate of interest. If the same principal P becomes Q in 1 year when compounded annually with S% annual rate of interest, then which one of the following is correct ?
R=S
R>S
R<S
R≤S
- When interest is compounded half-yearly, the formula becomes \( Q = P \left(1 + \frac{R/2}{100}\right)^2 \).
- When interest is compounded annually, the formula becomes \( Q = P \left(1 + \frac{S}{100}\right) \).
- Both scenarios result in the same amount \( Q \) after one year.
- Comparing the two formulas for \( Q \), \( \left(1 + \frac{R/2}{100}\right)^2 = 1 + \frac{S}{100} \).
- The equation essentially balances the benefits of more frequent compounding at a lower rate with annual compounding at a higher rate.
- In general, half-yearly compounding is more efficient, meaning \( 2R/2 < S \).
Option 3: R < S.
By: sunny bhonsle ProfileResourcesReport error
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