Effective Annual Rate (EAR)

### What does the Effective Annual Rate (EAR) take into account that the nominal rate does not? - [ ] Principal amount only - [x] Compounding periods - [ ] Loan fees - [ ] Specific loan purposes > **Explanation:** The Effective Annual Rate (EAR) takes into account the compounding periods, reflecting the true cost or earnings over a year more accurately than the nominal rate. ### A bank offers a nominal interest rate of 5% compounded quarterly. What is the approx. EAR? - [ ] 5% - [x] 5.09% - [ ] 4.89% - [ ] 4.75% > **Explanation:** Using the formula \\(\text{EAR} = (1 + \frac{0.05}{4})^4 - 1\\), the approximate EAR will be 5.09%. ### Why might a lender advertise a nominal rate instead of an EAR? - [x] It appears lower and more attractive to borrowers. - [ ] It’s more accurate. - [ ] Regulatory reasons require nominal rates. - [ ] Nominal rates are used for daily compounding. > **Explanation:** Lenders might advertise a nominal rate because it appears lower than the EAR, making the loan seem more attractive. ### If an investment has an EAR of 8%, what does this imply? - [x] The true annual return on the investment considering compounding is 8%. - [ ] The nominal rate is 8%. - [ ] The investment gains 8% each quarter. - [ ] The principal remains 8% plus compound interest. > **Explanation:** An EAR of 8% implies the annual return on the investment, considering the effect of compounding, is indeed 8%. ### What is the formula for calculating EAR? - [ ] EAR = i / n - [ ] EAR = i / (1 + n) - [x] EAR = (1 + i/n)^n - 1 - [ ] EAR = i * n > **Explanation:** The correct formula to calculate EAR is \\((1 + i/n)^n - 1\\), where \\(i\\) is the nominal rate and \\(n\\) is the number of compounding periods. ### How often is interest compounded in a situation where the EAR is 5% and nominal interest rate is 4.88%? - [ ] Daily - [ ] Yearly - [x] Monthly - [ ] Quarterly > **Explanation:** If compounding is done more frequently (monthly), the nominal rate of 4.88%, when compounded, results in an EAR of 5%. ### The EAR typically increases as the number of compounding periods...? - [x] Increases - [ ] Decreases - [ ] Remains the same - [ ] Doubles > **Explanation:** As the number of compounding periods increases, the EAR also increases. ### What does it mean if EAR is equal to the nominal interest rate? - [ ] No compounding is involved - [ ] Only quarterly compounding is used - [x] Interest is compounded annually - [ ] Daily compounding is used > **Explanation:** If EAR equals the nominal rate, interest is compounded annually, eliminating effects of intra-year compounding. ### To find the true return or cost annually, which rate should you consider? - [ ] APR - [ ] Nominal Rate - [x] EAR - [ ] Flat Rate > **Explanation:** The Effective Annual Rate (EAR) provides a true annualized return or cost considering compounding. ### For loan comparison purposes, which rate is most informative? - [ ] Nominal Rate - [x] Effective Annual Rate (EAR) - [ ] Flat Rate - [ ] Daily Interest Rate > **Explanation:** The Effective Annual Rate (EAR) is most informative for comparison as it considers compounding periods accurately.