Standard Deviation

B is correct. Fund Y's lower standard deviation (7% vs. 18%) indicates more stable, predictable returns with less volatility, which aligns with Jennifer's stated preference for steady growth and her moderate risk tolerance. While Fund Y has a slightly lower average return (9% vs. 11%), it offers more consistency year-to-year.

A focuses only on average return while ignoring Jennifer's explicit preference for avoiding "significant year-to-year fluctuations". Fund X's 18% standard deviation means returns could range from -7% to +29% in roughly 68% of years. C is incorrect because higher standard deviation indicates more volatility, not more diversification. D is incorrect because lower standard deviation indicates lower total risk, not higher systematic risk.

B is correct. Under a normal distribution, approximately 68% of returns fall within one standard deviation (plus or minus) of the mean return. This is a fundamental statistical concept known as the empirical rule or 68-95-99.7 rule.

A (50%) is incorrect and has no significance in standard deviation analysis. C (95%) is the percentage of returns falling within TWO standard deviations of the mean. D (99.7%) is the percentage of returns falling within THREE standard deviations of the mean.

B is correct. Calculate: Mean ± 1 standard deviation = 14% ± 10% = 4% to 24%. Under normal distribution, approximately 68% of returns fall within one standard deviation of the mean.

A (-6% to +34%) incorrectly uses two standard deviations (14% ± 20%), which would represent the 95% confidence interval. C (7% to 21%) incorrectly uses half of one standard deviation (14% ± 5%). D (10% to 18%) incorrectly uses a 4% range, which doesn't correspond to the given 10% standard deviation.

C is correct (the EXCEPT answer). Standard deviation does NOT measure only systematic risk. it measures TOTAL risk, which includes both systematic (market) risk AND unsystematic (company-specific) risk. This is a critical distinction from beta, which measures only systematic risk.

A is accurate: standard deviation captures all sources of volatility, making it a measure of total risk. B is accurate: higher standard deviation values indicate greater volatility and wider fluctuations in returns around the mean. D is accurate: standard deviation is expressed in percentage points, the same units as returns, which makes it interpretable (unlike variance, which is expressed in squared units).

C is correct. Statements 1, 2, and 3 are accurate.

Statement 1 is TRUE: Stock A's standard deviation (20%) is significantly higher than Stock B's (5%), indicating greater volatility and wider fluctuations in returns.

Statement 2 is TRUE: Using the 68% rule, Stock A's returns fall within one standard deviation of the mean approximately 68% of the time: 15% ± 20% = -5% to +35%.

Statement 3 is TRUE: Stock B's lower standard deviation (5% vs. 20%) indicates it has lower total risk, making it less risky from a volatility perspective.

Statement 4 is FALSE: Risk-adjusted return cannot be determined from average return alone. Stock A has higher absolute returns but also much higher risk. To evaluate risk-adjusted returns, you would need measures like the Sharpe ratio (which considers both return and standard deviation). Stock A's higher return comes with four times the volatility.