Question 1

Example 2 suggests that individuals have limited cognitive capacity to deal with compound lotteries.

Accepted Answer

Example 2, in the context of decision theory, typically illustrates how individuals struggle to process and evaluate the probabilities and outcomes of compound lotteries (lotteries where the prize itself is a lottery), highlighting the limitations in human cognitive capacity for dealing with complex probabilistic information.

Question 2

Under expected utility theory, risk aversion implies a concave utility function and vice versa.

Accepted Answer

Risk aversion in expected utility theory is represented by a concave utility function, as it reflects a diminishing marginal utility of wealth, meaning that the utility gained from an incremental unit of wealth decreases as wealth increases.

Question 3

Prospect theory is based on the notion that people classify gains and losses in the same way.

Accepted Answer

It is based on the notion that people classify gains and losses differently.

Question 4

A gain is always greater than 0 and a loss is always less than 0 .

Accepted Answer

Gains and losses are classified in terms of a reference point. Reference points can change depending on the scenario or how the gamble is framed.

Question 5

Prospect Theory suggests that the utility function is convex over losses and also that the slope of the utility function over losses is steeper than the slope of the utility function over gains.

Accepted Answer

Prospect Theory, developed by Daniel Kahneman and Amos Tversky, posits that people value gains and losses differently, leading to a value function that is generally concave for gains (implying risk aversion), convex for losses (implying risk seeking in the domain of losses), and steeper for losses than for gains, indicating that losses loom larger than gains.

Question 6

Khaneman and Tversky proposed a unique method for editing.

Accepted Answer

As the text explains, a decision-maker can arrive at very different choices depending on which order he employs each of the six editing criteria.

Question 7

When Prospect Theory uses rank dependent probability weighting functions it is known as Cumulative Prospect Theory.

Accepted Answer

Cumulative Prospect Theory extends Prospect Theory by incorporating rank-dependent probability weighting functions, which account for how people actually perceive probabilities, not as linear but in a distorted manner, making it a more accurate model of decision-making under risk.

Question 8

Rank dependent probability weights are sub-additive.

Accepted Answer

Rank dependent probability weights were introduced to deal with the suband super-additivity of probability weighting functions. By definition, they sum to 1 .

Question 9

In Example 3, Prospect theory can rationalize the behavior of betting on the favorites early in the night and the long-shots later in the night because bettors tend to lose money early in the night and then are operating in the loss domain later in the night.

Accepted Answer

Prospect theory suggests that individuals are more risk-averse when they perceive themselves to be in a domain of gains but become more risk-seeking in a domain of losses. Therefore, after losing money early (entering the loss domain), bettors are more likely to take risks on long-shots later in the night.

Question 10

Prospect Theory predicts that risk aversion over small gambles implies that decisionmakers will avoid risk at almost any cost in large gambles.

Accepted Answer

This is the prediction of expected utility theory. The "kink" at the reference point under prospect theory means that the utility function cannot be approximated by a straight line.

Question 11

What is the reflection effect?&#10;A) The observation that individuals are risk averse over gains and risk-loving over losses.&#10;B) The observation that individuals are risk loving over gains and risk-averse over losses.&#10;C) The observation that risk preferences switch between risk-loving and risk aversion depending on whether the outcome is a gain or loss.&#10;D) The observation that risk aversion observed over small gambles implies unreasonable levels of risk aversion over large gambles.

Accepted Answer

The answer of What is the reflection effect?&#10;A) The observation...

Question 12

Under expected utility theory, which of the following implies risk aversion?&#10;A) $E u(x)E(x)$&#10;C) $u^{\prime \prime}(x)>0$&#10;D) The utility function is convex.

Accepted Answer

The answer of Under expected utility theory, which of the...

Question 13

Let $u_{g}(x)$ be Julie's utility function over gains and $u_{l}(x)$ her utility function over losses. If Julie's preferences are best described with Prospect Theory, which of the following is an example of Julie's value function?

A)

\quad v(x \mid 0)= \begin{cases}\ln (x), & x>0 \\ 0, & x=0 \\ -x, & x<0\end{cases}

B)

\quad v(x \mid 0)= \begin{cases}\mathrm{X}, & x>0 \\ 0, & x=0 \\ -\ln (-x), & x<0\end{cases}

C)

\quad v(x \mid 0)=\left\{\begin{array}{l}x, x>0 \\ x, x=0 \\ x, x<0\end{array}\right.

D)

\quad(x \mid 0)=\left\{\begin{array}{c}\ln (x), x>0 \\ -\left(x^{2}\right), \quad x \leq 0\end{array}\right.

Accepted Answer

The answer of Let $u_{g}(x)$ be Julie's utility function over...

Question 14

At $x=2$ which utility function has the steepest slope?&#10;A) $u(x)=\ln (x)$&#10;B) $u(x)=\sqrt{x}$&#10;C) $u(x)=.05 \mathrm{x}$&#10;D) $u(x)=\frac{x^{4}}{.4}$

Accepted Answer

The answer of At $x=2$ which utility function has the...

Question 15

All of the following are one of the three components of prospect theory proposed by Khaneman and Tversky EXCEPT:&#10;A) Editing&#10;B) Coding.&#10;C) Probability Weighting.&#10;D) Value Function.

Accepted Answer

The answer of All of the following are one of...

Question 16

Under which of the six editing tasks will an individual classify outcomes as gains or losses?&#10;A) Classification.&#10;B) Segregation.&#10;C) Cancellation.&#10;D) Coding.

Accepted Answer

The answer of Under which of the six editing tasks...

Question 17

The reduction of a compound lottery occurs during which of the six editing tasks?&#10;A) Simplification.&#10;B) Segregation.&#10;C) Cancellation.&#10;D) Reduction.

Accepted Answer

The answer of The reduction of a compound lottery occurs...

Question 18

Which of the following presents problem for prospect theory?&#10;A) Non-dichotomous decisions&#10;B) The reflection effect.&#10;C) Misperception of probabilities.&#10;D) Reference points.

Accepted Answer

The answer of Which of the following presents problem for...

Question 19

The isolation effect concerns which of the following types of lotteries:&#10;A) Lotteries with non-dichotomous outcomes.&#10;B) Lotteries over small gambles.&#10;C) Lotteries over large gambles.&#10;D) Compound lotteries.

Accepted Answer

The answer of The isolation effect concerns which of the...

Question 20

In Example 2, which of the parameters concern the curvature of the value functions?&#10;A) $\alpha, \gamma$&#10;B) $\beta, \gamma$&#10;C) $\alpha, \beta$&#10;D) $\gamma, \delta$

Accepted Answer

The answer of In Example 2, which of the parameters...

Question 21

In Example 2, suppose $\lambda=1$. Which of the following statements would be true?&#10;A) The utility function is concave in losses.&#10;B) The utility function is convex in gains.&#10;C) The utility function does not display loss aversion.&#10;D) The value function over losses is linear.

Accepted Answer

The answer of In Example 2, suppose $\lambda=1$. Which of...

Question 22

Renee plans a night out at the casino. On the way to the casino, she is pulled over for speeding and gets a $\$ 100$ speeding ticket. She incorporates this into her nightly expenses. Thus, when Renee arrives at the casino, which gamble does prospect theory suggest she'll prefer.

A) Renee will be indifferent between all gambles.
B)

\$ 50

for sure.
C)

\$ 100

with probability .5.
D)

\$ 200

with probability.25.

Accepted Answer

The answer of Renee plans a night out at the...

Question 23

William has a utility function given by

U(x)=\ln (\mathrm{x})

. He faces a gamble that pays 10 with probability .5 and 15 with probability .5 . What is William's certainty equivalent - that is, what sure amount must he receive in order to be indifferent between the gamble and this sure amount?
a. Find

x_{C E}

if William's utility was given by

U(x)=x

b. Find

x_{C E}

if William's utility was given by

U(x)=x^{2}

.

Accepted Answer

The answer of William has a utility function given by...

Question 24

Consider the following compound lotteries: first a coin is flipped. If the coin comes up heads, you get to play out either simple lottery A or simple lottery B, where lottery A is given by

54 \%

chance of

\$ 99

and lottery B is given by a

24 \%

chance of

\$ 199

. Before flipping the coin, you must choose between lottery A and lottery B.
a. Suppose you edit in the following order: Cancelation, Simplification. What do you perceive the final lottery choices to be?
b. Now suppose you edit in the following order: Combination, Simplification. What do you perceive the final lottery choices to be?

Accepted Answer

The answer of Consider the following compound lotteries: first a...

Question 25

Polly is betting at the racetrack. At the beginning of the evening she bets on the favorites and wins more money than she loses. During the end of the evening, Polly decides to bet on some long-shots. Can prospect theory rationalize her behavior?

Accepted Answer

The answer of Polly is betting at the racetrack. At...

Deck 10: Prospect Theory and Decision Under Risk or Uncertainty