Compound Interest

### What is compound interest? - [ ] Interest calculated only on the initial principal. - [x] Interest calculated on the initial principal and the accumulated interest. - [ ] Interest calculated on the principal minus accrued interest. - [ ] Interest added to a savings bond once at the end of the term. > **Explanation:** Compound interest is calculated on both the initial principal and the accumulated interest from previous periods, differing from simple interest which is only calculated on the initial principal. ### Can compound interest lead to exponential growth of an investment? - [x] Yes, because of the interest-on-interest effect. - [ ] No, because interest is only calculated annually. - [ ] It depends if the interest rate is high. - [ ] Only if the investment amount is large. > **Explanation:** Yes, compound interest can lead to exponential growth because the interest is calculated on the accumulated interest from previous periods, not just the initial principal. ### What does the 'n' represent in the compound interest formula? - [ ] Number of years - [x] Number of times interest is compounded per year - [ ] Interest rate - [ ] Principal amount > **Explanation:** In the compound interest formula, 'n' represents the number of times interest is compounded per year. ### How does the compounding frequency affect the amount of compound interest earned? - [x] More frequent compounding leads to more interest. - [ ] Less frequent compounding leads to more interest. - [ ] Compounding frequency does not matter. - [ ] Only annual compounding generates more interest. > **Explanation:** More frequent compounding (e.g., monthly instead of annually) leads to more interest earned over the same period, as interest is calculated on the accumulated interest more frequently. ### How does compound interest differ from simple interest over a long period? - [ ] Compound interest is less beneficial. - [x] Compound interest accumulates more due to interest-on-interest. - [ ] Simple interest accumulates the same amount. - [ ] Both remain unaffected by the time period. > **Explanation:** Over a long period, compound interest accumulates more than simple interest because of the interest-on-interest effect, resulting in higher amounts due to frequent compounding. ### What is required for compound interest to occur? - [x] Initial principal, interest rate, time period, and compounding frequency. - [ ] Principal alone. - [ ] Interest rate alone. - [ ] Just the time period of the investment. > **Explanation:** For compound interest to occur, an initial principal, interest rate, time period, and compounding frequency are required to calculate the future value. ### Which investment scenario benefits more from compound interest? - [ ] High-interest rate investment with no compounding. - [x] Moderate interest rate investment with high compounding frequency. - [ ] Low-interest rate investment with daily compounding. - [ ] Any investment with an initial high principal. > **Explanation:** A moderate interest rate investment with high compounding frequency benefits more because the accrued interest also earns interest over time. ### Why might compound interest be disadvantageous for borrowers? - [x] It increases the total interest payable. - [ ] It simplifies the interest calculation. - [ ] It does not affect the total repayment. - [ ] It reduces the overall principal amount. > **Explanation:** Compound interest can be disadvantageous for borrowers as it increases the total interest payable due to interest being calculated on the accumulated interest, resulting in higher total amounts owed. ### If a savings account promises 5% annual interest compounded monthly, what does it signify? - [x] Interest is calculated each month on the accumulating amount. - [ ] Interest is calculated annually then divided by 12. - [ ] Simple interest is distributed monthly. - [ ] Interest compounding starts after one year. > **Explanation:** It signifies that the interest is calculated each month on the accumulating amount, leading to more interest earned compared to simple annual compounding. ### What is the Effective Annual Rate (EAR) if the APR is 12% and compounded monthly? - [x] Approximately 12.68% - [ ] 12% - [ ] 13% - [ ] 11.39% > **Explanation:** The EAR takes into account the effect of monthly compounding on the annual rate. Using the formula, \\(EAR = (1 + \frac{APR}{n})^n - 1\\), the EAR = (1 + 0.01)^12 - 1 ≈ 12.68%.