Portfolio Performance Measures

B is correct. The Sharpe ratio uses total risk (standard deviation) in its calculation: (Return - Risk-free rate) ÷ Standard deviation. Because it considers total risk rather than just systematic risk, it is most appropriate for evaluating undiversified portfolios that still contain unsystematic risk.

A (Treynor ratio) uses systematic risk (beta) rather than total risk, making it better for diversified portfolios. C (Information ratio) measures active return per unit of tracking error and is used for active managers. D (Jensen's alpha) measures excess return versus CAPM predictions but is not a ratio comparing return to risk.

A is correct. Alpha measures actual return minus expected return based on CAPM. First, calculate expected return using CAPM: 3% + 1.2(10% - 3%) = 3% + 8.4% = 11.4%. Then calculate alpha: 12% - 11.4% = 0.6%. The positive alpha indicates the portfolio outperformed expectations by 0.6%.

B (2.0%) incorrectly subtracts the risk-free rate from the actual return (12% - 10%). C (3.6%) appears to calculate excess return over the market (12% - 10% = 2%, then incorrectly adding something). D (9.0%) incorrectly subtracts the risk-free rate from the actual return (12% - 3%).

D is correct. Sharpe and Treynor ratios cannot be directly compared because they use different risk measures in their denominators. The Sharpe ratio uses standard deviation (total risk), while the Treynor ratio uses beta (systematic risk). They measure different aspects of risk-adjusted performance and are expressed in different units.

A, B, and C all incorrectly assume the ratios can be compared. The only way to meaningfully compare these portfolios would be to calculate both ratios for both portfolios, then compare Sharpe to Sharpe and Treynor to Treynor separately. For a well-diversified portfolio, the Treynor ratio would be the more appropriate measure since unsystematic risk has been diversified away.

A is correct. R-squared (coefficient of determination) measures the percentage of a portfolio's returns that can be explained by movements in the benchmark. An R-squared of 0.45 means only 45% of the fund's returns are explained by the S&P 500, indicating the fund is not well-diversified relative to that benchmark and likely follows a different strategy or holds different securities.

B (45% systematic risk) misunderstands R-squared as a risk measure rather than a correlation measure. C (fund beta is 0.45) confuses R-squared with beta, which are different measures. D (outperformed by 45%) incorrectly interprets R-squared as a return measure rather than a diversification measure.

C is correct. The Sharpe ratio is calculated as (Return - Risk-free rate) ÷ Standard deviation. Fund A: (14% - 2%) ÷ 18% = 0.67. Fund B: (11% - 2%) ÷ 10% = 0.90. Fund B has the higher Sharpe ratio despite having lower absolute returns, because it achieved better risk-adjusted performance by taking on less total risk.

A (Fund A) correctly calculates Fund A's Sharpe ratio but incorrectly concludes it is higher. B (same Sharpe ratio) is mathematically incorrect. D (cannot be determined without beta) confuses the Sharpe ratio with the Treynor ratio, which uses beta rather than standard deviation.

D is correct. Beta measures systematic risk relative to the market. A beta of 1.5 indicates the security is expected to move 1.5 times as much as the market, or 50% more than the market's movements. If the market rises 10%, the security would be expected to rise 15%.

A (reliable when R-squared below 0.50) is backwards. Beta is most reliable when R-squared is high (above 0.70). B (total risk) is incorrect because beta only measures systematic risk, not total risk (which is measured by standard deviation). C (negative beta impossible) is wrong because some securities can have negative beta (moving opposite to the market), though this is rare for equity securities.

D is correct. The information ratio measures active return per unit of active risk (tracking error). It is calculated as (Portfolio return - Benchmark return) ÷ Tracking error. In this case: (16% - 14%) ÷ 4% = 2% ÷ 4% = 0.50. This indicates the manager generated 0.50 units of excess return for each unit of tracking error.

A (4.00) uses only the tracking error without performing the division, confusing the input with the output. B (3.50) appears to subtract tracking error from the excess return before dividing. C (0.25) incorrectly inverts the calculation (4% ÷ 16%).

A is correct. Jensen's alpha measures actual return minus expected return based on CAPM. Expected return = Risk-free rate + Beta × (Market return - Risk-free rate) = 3% + 0.80 × (12% - 3%) = 3% + 7.2% = 10.2%. Alpha = Actual return - Expected return = 9% - 10.2% = -1.2%. The negative alpha indicates underperformance relative to expectations given the portfolio's beta.

B (0.0%) would suggest performance exactly matched expectations. C (+1.2%) has the correct magnitude but wrong sign. D (+6.0%) incorrectly calculates excess return over risk-free rate (9% - 3%) rather than using CAPM.

C is correct. Time-weighted return (TWR) eliminates the impact of cash flows (deposits and withdrawals) by breaking the performance period into sub-periods and geometrically linking the returns. This makes it the preferred method for comparing portfolio managers, as it isolates the manager's investment decisions from the client's timing of deposits and withdrawals.

A (Dollar-weighted return) and B (Internal rate of return) are the same thing and both include the impact of cash flows, measuring the investor's actual experience rather than manager performance. D (Holding period return) is a simple return calculation for a single period that does not eliminate cash flow impact.

B is correct. The Sharpe ratio is most appropriate for concentrated or undiversified portfolios because it uses standard deviation, which captures total risk (both systematic and unsystematic). Since this portfolio holds only 8 stocks, it likely contains significant unsystematic risk that has not been diversified away. The Sharpe ratio will properly account for this total risk.

A (Treynor ratio) uses beta, which only measures systematic risk. This would be inappropriate for an undiversified portfolio because it would ignore the unsystematic risk still present. C (Information ratio) measures active return versus a benchmark and is not specifically designed for undiversified portfolios. D (Jensen's alpha) measures excess return but is not a ratio and does not specifically capture unsystematic risk.