Sortino Ratio
Sortino Ratio
A measure of risk-adjusted return that penalizes only downside deviation (volatility below a target return) rather than total volatility like the Sharpe ratio. Calculated as (portfolio return - target return) / downside deviation. Higher ratios indicate better risk-adjusted performance, focusing specifically on harmful volatility.
Two portfolios both return 10% annually. Portfolio A has 12% total volatility with 6% downside deviation. Portfolio B has 8% total volatility with 8% downside deviation. While Portfolio B has lower total volatility (better Sharpe ratio), Portfolio A has lower downside deviation (better Sortino ratio), making it preferable for investors who only care about downside risk.
Students often confuse Sortino with Sharpe ratio. Key distinction: Sharpe penalizes ALL volatility (upside and downside), while Sortino only penalizes downside deviation below the target return. Use Sortino when investors don't mind upside volatility.
How This Is Tested
- Distinguishing between when to use Sortino ratio versus Sharpe ratio based on investor preferences
- Understanding that Sortino focuses on downside deviation while Sharpe uses total standard deviation
- Comparing two portfolios with similar returns but different volatility patterns using Sortino ratio
- Recognizing that higher Sortino ratios indicate better protection against downside risk
- Identifying the appropriate target return (often risk-free rate or minimum acceptable return) for Sortino calculations
Calculation Example
Sortino Ratio = (Portfolio Return - Target Return) / Downside Deviation - Identify the portfolio return: 12%
- Identify the target return (minimum acceptable return): 4%
- Identify the downside deviation: 8%
- Calculate excess return above target: 12% - 4% = 8%
- Divide excess return by downside deviation: 8% / 8% = 1.00
Example Exam Questions
Test your understanding with these practice questions. Select an answer to see the explanation.
Jennifer, a 52-year-old conservative investor, is evaluating two balanced funds for her portfolio. She tells her adviser she doesn't mind when her portfolio gains fluctuate, but she's very concerned about losses below her 5% annual target return. Fund A returned 11% with 14% total standard deviation and 7% downside deviation. Fund B returned 10% with 10% total standard deviation and 9% downside deviation. Which fund is most appropriate for Jennifer's stated preferences?
B is correct. Given Jennifer's specific concern about downside volatility (not upside volatility), the Sortino ratio is the most appropriate metric. Fund A's Sortino ratio: (11% - 5%) / 7% = 0.86. Fund B's Sortino ratio: (10% - 5%) / 9% = 0.56. Fund A has the superior Sortino ratio, meaning it generates better risk-adjusted returns when focusing only on harmful downside volatility.
A is partially correct about the higher return but doesn't address Jennifer's specific concern about risk-adjusted performance focused on downside protection. C would be correct if Jennifer cared about total volatility, but she explicitly stated she doesn't mind upside fluctuations, making Sharpe ratio (which penalizes all volatility) the wrong metric. D is incorrect in its calculation: Fund A has lower downside deviation (7% vs 9%), not Fund B.
The Series 65 exam tests your ability to match performance metrics to client preferences and risk tolerances. Understanding when Sortino ratio is more appropriate than Sharpe ratio (when clients differentiate between upside and downside volatility) is critical for making suitable recommendations. This scenario-based question type is common on the exam.
Which of the following best describes the primary difference between the Sortino ratio and the Sharpe ratio?
B is correct. The fundamental difference is that Sortino ratio uses downside deviation (volatility below a target return) in the denominator, while Sharpe ratio uses total standard deviation (all volatility, both upside and downside). This makes Sortino more appropriate when investors don't view upside volatility as risk.
A is incorrect: Both Sortino and Sharpe use measures of volatility in the denominator, not beta (that would be Treynor ratio). B describes the beta-based Treynor ratio. C is incorrect: Both measure risk-adjusted returns, not a distinction between absolute and relative. D is partially misleading: Sortino typically uses a target return (often the minimum acceptable return or MAR), while Sharpe uses the risk-free rate, but this isn't the primary conceptual difference. The key is what type of risk (volatility) is being measured.
The Series 65 exam frequently tests your knowledge of how different performance metrics measure risk. Confusing which metrics use which risk measures (total volatility vs downside deviation vs beta) is a common exam error. Understanding that Sortino focuses only on "bad" volatility is essential for client suitability discussions.
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Access Free BetaA portfolio has a 15% annual return, 12% total standard deviation, 6% downside deviation, and the risk-free rate is 3%. The target return for downside deviation is 3%. Which of the following statements is accurate?
B is correct. Sharpe ratio: (15% - 3%) / 12% = 1.00. Sortino ratio: (15% - 3%) / 6% = 2.00. The Sortino ratio is higher because downside deviation (6%) is lower than total standard deviation (12%), meaning the portfolio has significant upside volatility that Sharpe penalizes but Sortino ignores. This indicates the portfolio's volatility is more favorable (asymmetric toward gains).
A is incorrect in stating they are identical: while both use the same numerator (excess return of 12%), they use different denominators (12% vs 6%). C has incorrect calculations: it reverses the values and the relationship. D is incorrect: Sortino ratio uses downside deviation, not beta. Beta is used in the Treynor ratio, not Sortino or Sharpe.
The Series 65 exam tests your ability to calculate and interpret both Sharpe and Sortino ratios, and to understand what it means when they differ significantly. A portfolio with a much higher Sortino than Sharpe ratio has asymmetric returns (more upside volatility than downside), which is favorable. This interpretation skill is critical for portfolio evaluation.
All of the following statements about the Sortino ratio are accurate EXCEPT
C is correct (the EXCEPT answer). The Sortino ratio is NOT identical to the Sharpe ratio even when returns are symmetric. They use different denominators: Sortino uses downside deviation (volatility below target), while Sharpe uses total standard deviation (all volatility). Even with symmetric returns, downside deviation typically differs from total standard deviation because it only measures one side of the distribution.
A is accurate: This is the defining characteristic of the Sortino ratio versus Sharpe ratio. B is accurate: Like all risk-adjusted metrics, higher values indicate better performance (more return per unit of risk taken). D is accurate: The Sortino ratio is specifically designed for investors who differentiate between upside volatility (acceptable or desirable) and downside volatility (undesirable risk), making it superior to Sharpe for these investors.
The Series 65 exam tests your comprehensive understanding of performance metrics and their appropriate applications. Understanding that Sortino and Sharpe are mathematically different (not just conceptually different) helps you avoid the common error of treating them as interchangeable or identical under certain conditions.
An investment adviser is evaluating Fund X, which has a 14% return, 16% total standard deviation, 9% downside deviation, and the target return is 4%. Which of the following statements are accurate?
1. Fund X has a Sortino ratio greater than 1.0
2. Fund X has more upside volatility than downside volatility
3. The Sortino ratio is more favorable than the Sharpe ratio for this fund (assuming risk-free rate of 3%)
4. An investor who views all volatility as risk should prefer the Sharpe ratio over the Sortino ratio for evaluating this fund
D is correct. All four statements (1, 2, 3, and 4) are accurate.
Statement 1 is TRUE: Sortino ratio = (14% - 4%) / 9% = 10% / 9% = 1.11, which is greater than 1.0. This indicates the fund generates more than 1% of excess return for each 1% of downside risk.
Statement 2 is TRUE: The downside deviation (9%) is significantly less than total standard deviation (16%), indicating the fund has substantial upside volatility. If volatility were symmetric, downside deviation would be approximately half of total standard deviation (8%). Since it's 9% versus 16%, more volatility occurs on the upside.
Statement 3 is TRUE: Sortino ratio (1.11) is higher than Sharpe ratio: (14% - 3%) / 16% = 11% / 16% = 0.69. The Sortino ratio appears more favorable because it ignores the upside volatility that Sharpe penalizes.
Statement 4 is TRUE: If an investor views ALL volatility (both upside and downside) as risk, then the Sharpe ratio is the appropriate metric because it penalizes total standard deviation. Sortino is only appropriate when investors differentiate between good (upside) and bad (downside) volatility.
The Series 65 exam tests your ability to calculate both metrics, understand their relationship, and determine which is appropriate based on investor preferences. This multi-dimensional analysis combining calculation, interpretation, and suitability matching is common in scenario-based exam questions and reflects real-world adviser decision-making.
💡 Memory Aid
Remember "SORTINO = Sorts Out the BAD volatility": Unlike Sharpe (which penalizes ALL ups and downs), Sortino only cares about downside deviation below your target. Think of it as focusing only on the painful drops, not the happy gains. Perfect for investors who say "I don't mind gains bouncing around, I just hate losses!"
Related Concepts
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