Portfolio Theory

Question 1

What is a portfolio?

Answer 1

A collection of securities with different risks and returns associated.

Question 2

What is the realised return?

Answer 2

A geometric average of past returns.

Question 3

What are the three characteristics of portfolios?

Answer 3

First: Expected Return
Second: Variance
Third: Covariance

Question 4

What is the expected return?

Answer 4

Expected return is the best guess for the return that will be achieved the next period.

Question 5

What are the methodologies we can use to find the expected return?

Answer 5

Distribution of Returns and Sample of Past Returns

Question 6

What is the formula for the expected return when we use the methodology of distribution of returns?

Answer 6

E(ri) = ∑piri

Question 7

What is the excel formula we should use to find the expected return (using distribution of returns)?

Answer 7

=sumproduct()

Question 8

When can we use the mean return to find the expected return?

Answer 8

When observations are independent and identical distributed, the Law of Large Numbers states that the mean return converges in probability to the true expected return,

Question 9

What is the excel formula we should use to find the expected return (using a sample of past returns)?

Answer 9

=average

Question 10

What is the variance of the return?

Answer 10

The best guess for the measurement error. It tells us how much should an investor expect to fail prediction. It is the measure of risk.

Question 11

What are the methodologies we can use to find the variance?

Answer 11

Distribution of Returns and Sample of Past Returns

Question 12

What is the formula to find the variance using the distribution of returns?

Answer 12

∑ pi [ri - E(ri)]^2

Question 13

True or false: The variance of the mean return is the true variance.

Answer 13

False

Question 14

What is the volatitility?

Answer 14

The risk, it’s the standard deviation

Question 15

In excel, what formula should we use to find the variance?

Answer 15

=var.s()

Question 16

In excel, what formula should we use to find the standard deviation?

Answer 16

=stdev.s()

Question 17

What does the covariance measure?

Answer 17

The relationship between two random variables.

Question 18

What does it mean when a covariance is positive?

Answer 18

On expectation, the returns of the two securities move in the same direction.

Question 19

What does it mean when a covariance is negative?

Answer 19

On expectation, the returns of the two securities move in opposite directions.

Question 20

What does it mean when a covariance is zero?

Answer 20

We suspect the securities are independent.

Question 21

Why do we compute the coefficient of correlation?

Answer 21

Because we can only interpret the sign of the covariance.

Question 22

What is the interval of values the coefficient of correlation can take?

Answer 22

Between-1 to 1

Question 23

How do you calculate the coefficient of correlation?

Answer 23

COV/σaσb

Question 24

What does it mean if the coefficient of correlation is 1?

Answer 24

The two securities move by the same amount in % points in the same direction.

Question 25

What does it mean if the coefficient of correlation is -1?

Answer 25

The two securities move by the same amount in % points in opposite directions.

Question 26

In Excel, how do you compute the covariance?

Answer 26

=covariance.s()

Question 27

In Excel, how do you compute the coefficient of correlation?

Answer 27

=correl()

Question 28

How can risks be grouped?

Answer 28

Firm Specific/Idiosyncratic Risk and Systematic Risk

Question 29

What is Idiosyncratic Risk?

Answer 29

Types of risk that share no correlation.

Question 30

What is Systematic Risk?

Answer 30

Risk that affects all firms, but not all in the same way.

Question 31

How do we compute the weight?

Answer 31

Value allocated in a specific security/Wealth

Question 32

What is a long position?

Answer 32

When an investor invests in a security, the return will be received. w > 0

Question 33

What is a short position?

Answer 33

When an investor short sells a security, the return will be paid.
w < 0

Question 34

What is the expected return of a portfolio?

Answer 34

The weighted average of the expected return of its components.

Question 35

True or false: when focusing on diversification, we focus on long positions and short positions.

Answer 35

False, only long positions

Question 36

Why do investors create portfolio?

Answer 36

Gains from diversification

Question 37

True or false: there is an added advantage of creating portfolios in terms of returns.

Answer 37

False, the expected return of a portfolio is given by the weighted average of the individual expected returns.

Question 38

True or false: the portfolio’s volatility is the weighted average of the individual volatilities.

Answer 38

False, due to the covariance term.

Question 39

What are the gains from diversification?

Answer 39

The difference between the portfolio’s volatility and the average volatility of the individual securities in the portfolio.

Question 40

When do we have gains from diversification?

Answer 40

When the standard deviation of the portfolio is lower than the individual standard deviations.

Question 41

What happens the more we diversify?

Answer 41

The more we diversify, the further the portfolio’s risk is from the average of individual risks.

Question 42

True of false: the more we diversify the less risk the portfolio has.

Answer 42

False, diversification doesn’t mean less risk, but even if the portfolio’s risk increases the weighted average has to increase more.

Question 43

How can we eliminate firm specific risk?

Answer 43

By diversifying.

Question 44

What is the minimum variance portfolio?

Answer 44

The minimum variance portfolio is the combination of weights that combines two securities that presents the lowest volatility.

Question 45

What is the formula for the MVP?

Answer 45

wa = (σb^2 - COV) / (σa^2 + σb^2 - 2COV)

Question 46

True or false: the coefficient of correlation has no effect on the expected return of a portfolio.

Answer 46

True

Question 47

What happens to the variance when the correlation increases and both securities are long positions?

Answer 47

Increases

Question 48

What happens to the variance when the correlation increases and both securities are short positions?

Answer 48

Increases

Question 49

What happens to the variance when the correlation increases and one security is a short position and the other a long position?

Answer 49

Decreases

Question 50

When can we create portfolios with zero risk?

Answer 50

When the correlation is either -1 (positive weights) or 1 (negative weights).

Question 51

What are efficient portfolios?

Answer 51

For a given risk, it’s the one with the highest expected return. For a given expected return, it’s the one with the lowest risk.

Question 52

What does the Sharpe Ratio tell us?

Answer 52

For one unit of risk how many units of excess return the portfolio returns.

Question 53

If over time the risk free changes, how can we say there’s no risk?

Answer 53

Over time it won’t be zero but when we invest the volatility of the investment is zero.

Question 54

What is the Market Portfolio?

Answer 54

The Market Portfolio combines all risky securities (not the risk free). When we’re maximising sharpe ratio, we’re maximising gains from diversification which eliminates risks. The market portfolio only includes systematic risks The market portfolio selects its weights for all securities in order to maximise the sharpe ratio.

Question 55

True or false: the market portfolio includes idiosyncratic risk.

Answer 55

False, only systematic risk.

Question 56

True or false: the market portfolio includes the risk free security.

Answer 56

False, only risky assets

Question 57

What does the Capital Market Line tell us?

Answer 57

The CML tells us all the different efficient portfolios.

Question 58

Can we use the Capital Market Line to combine two risky securities?

Answer 58

No, only the risk free with the market portfolio.

Question 59

How do we find the optimal portfolio?

Answer 59

Since all portfolios along the CML, we also need to maximise the utility function of the investor.

Question 60

True or false: Assume that the covariance between two stocks is negative. When the return of one stock is higher than its own expectation the return of the other stock is always below its own expectation

Answer 60

False

Question 61

True or false: Consider that the coefficient of correlation between two stocks is +1. This implies that when the return of one stock increases by 5pp (pp - percentage points), the return of the other increases by 5pp (pp – percentage points).

Answer 61

True

Question 62

True or false: The covariance between a stock and itself is +1.

Answer 62

False

Question 63

Stocks X and Y expected returns are 20% and 10%. Stock X’s volatility is two-times higher than stock Y’s volatility. The returns on stocks X and Y are independent. The risk-free rate is 2%.
True or false: Consider that you want to create a portfolio W that combines stocks X and Y, which has an expected return of 12%. If the coefficient of correlation between X and Y increases, the standard deviation of portfolio W increases.

Answer 63

True

Question 64

Stocks X and Y expected returns are 20% and 10%. Stock X’s volatility is two-times higher than stock Y’s volatility. The returns on stocks X and Y are independent. The risk-free rate is 2%.
True or false: Consider a portfolio “P” that is invested 50% in X and 50% in Y. The higher the stock’s Y volatility, the lower will be the Sharpe Ratio of portfolio P.

Answer 64

True

Question 65

Stocks X and Y expected returns are 20% and 10%. Stock X’s volatility is two-times higher than stock Y’s volatility. The returns on stocks X and Y are independent. The risk-free rate is 2%.
True or false: A portfolio that is invested 20% in X and 80% in Y has a zero volatility.

Answer 65

False

Question 66

True or false: The Sharpe Ratio of a portfolio that combines the riskless asset and portfolio X always has the same Sharpe Ratio as portfolio X.

Answer 66

True

Question 67

True or false: The CML can give you the expected return of a portfolio that combines three stocks and has a given standard deviation.

Answer 67

False

Question 68

True or false: The SML only provides equilibrium returns of efficient portfolios.

Answer 68

False

Question 69

True or false: Portfolio’s diversification decreases the portfolio’s total risk.

Answer 69

False

Question 70

True or false: Two stock that are in equilibrium and have the same exposure to systematic risk, should present the same equilibrium expected return.

Answer 70

True

Question 71

True or false: Consider that you created a portfolio with equal weights in 5 stocks. If the coefficient of correlation for each pair of stocks is +1 you can compute the portfolio’s standard deviation using the following expression: σp = ∑ wiσi

Answer 71

True

Question 72

True or false: As an investor diversifies her portfolio, the portfolio’s standard deviation decreases.

Answer 72

False

Question 73

True or false: The correlation of a stock with itself is the variance.

Answer 73

False

Question 74

True or false: Consider an economy with N stocks. All stocks have the same expected return, the same standard deviation, and the covariance for every different pair of stocks is zero. As any investor diversifies his portfolio, the portfolio’s Sharpe ratio increases.

Answer 74

True

Question 75

True or false: Consider a portfolio with 40% invested in security X, 80% in security Y, and a short position in security Z with a weight of -20%. The lower the coefficient of correlation between securities X and Z the lower will be the portfolio’s expected return.

Answer 75

False

Question 76

True or false: The higher the beta for an efficient portfolio, the lower will be the weight in the riskfree asset.

Answer 76

True

Question 77

True or false: Assume that all securities are in equilibrium. The beta on all efficient portfolios is the same as the beta for the market portfolio.

Answer 77

False

Question 78

True or false: The higher the coefficient of risk-aversion for a given investor, the lower will be the Sharpe ratio for the investor’s optimal efficient portfolio.

Answer 78

False

Question 79

True or false: The beta of a portfolio is given by the weighted average of the individual betas from the portfolio’s individual securities.

Answer 79

True

Question 80

True or false: For an efficient portfolio, the higher the weight on the market portfolio, the higher will be its Sharpe ratio.

Answer 80

False

Question 81

True or false: All efficient portfolios present the same percentage of systematic risk.

Answer 81

False

Question 82

True or false: The more an agent benefits from diversification gains, the lower will be the portfolio’s standard deviation.

Answer 82

False

Question 83

True or false: When all coefficients of correlation are lower than 1, any portfolio with more than two securities will satisfy the following condition: σp < ∑ wiσi

Answer 83

False

Question 84

True or false: When the correlation between two stocks is +1 it is impossible to have gains from diversification.

Answer 84

False

Question 85

True or false: The higher the coefficient of correlation between two stocks the lower will be the portfolio’s volatility

Answer 85

False

Question 86

True or false: For an equally weighted portfolio the lower the coefficients of correlation of its components the higher will be its Sharpe Ratio.

Answer 86

True

Question 87

True or false: Two securities with the same beta have the same exposure to systematic risk

Answer 87

True

Question 88

True or false: A portfolio is efficient if for a given volatility it is the portfolio with the highest expected return.

Answer 88

True

Question 89

True or false: A portfolio is efficient if it has the same beta as the Market portfolio.

Answer 89

False

Question 90

True or false: The higher the weight on the market portfolio, on an efficient portfolio, the higher will be its beta.

Answer 90

True

Question 91

True or false: All portfolios with a beta of 1 (same as the market portfolio) are efficient portfolios.

Answer 91

False

Question 92

True or false: The more an investor diversifies her portfolio, the lower will be the following difference: |𝜎𝑝 − ∑𝑖 𝜔𝑖𝜎𝑖|.

Answer 92

False

Question 93

True or false: The more an agent benefits from diversification gains, the lower will the portfolio’s average standard deviation.

Answer 93

False

Question 94

True or false: Assume that the covariance between two stocks is negative. When the return of one stock is higher than its own expectation the return of the other stock is on average below its own expectation.

Answer 94

True

Question 95

True or false: The minimum variance portfolio with two stocks presents a standard deviation equal to zero.

Answer 95

False

Question 96

True or false: Consider a portfolio with 40% invested in security A, 80% in security B, and a short position in security C with a weight of -20%. The lower the coefficient of correlation between securities A and B the higher will be the portfolio’s Sharpe ratio.

Answer 96

True

Question 97

True or false: The Sharpe Ratio of a portfolio that combines the riskless asset and portfolio W always has a higher Sharpe Ratio than portfolio W.

Answer 97

False

Question 98

True or false: When using the CML, if you insert the standard deviation of security A you get the expected return of security A.

Answer 98

False

Question 99

True or false: The SML provides equilibrium returns for any security, any portfolio, and any efficient portfolio.

Answer 99

True

Question 100

True or false: Efficient portfolios combine the risk-free asset with the portfolio with the lowest Sharpe ratio.

Answer 100

False

Question 101

True or false: The beta on all efficient portfolios is the same as the market portfolio’s beta.

Answer 101

False

Question 102

True or false: The more risk averse the agent is the lower will be the Sharpe ratio on her optimal efficient portfolio.

Answer 102

False