Utility Flashcards
Utility
The sense of happiness, welfare or psychic benefit that one gets from wealth level or rate of return (or other economic goods)
Axioms of utility theory
- Investors prefer more to less
- Investors behave rationally and make consistent rational decisions
- Investors appreciate certainty: they would rather take a certainty equivalent amount today over a chance at a higher but uncertain amount.
Risk-loving characteristics
- enters a fair game of chance at a price higher than the expected value.
- convex utility curve: next unit of wealth will increase investors utility more than the last unit did.
- u’(w) > 0
- u’’(w) > 0 -> MU increases at a faster rate for higher levels of wealth.
- E[U(W)] > U[E(W)]
Expected utility of wealth is greater than utility of expected wealth
Risk-averse characteristics
-concave u fn
- utility added from each additional unit of wealth diminishes as wealth increases
- u’(w) > 0
- u’’(w) < 0
Utility fns with ARAs and RRA
all risk averse investors
Log -> decreasing ARA -> constant RRA
Quadratic -> increasing ARA -> increasing RRA
Power -> decreasing ARA -> constant RRA
Exponential -> constant ARA -> decreasing RRA
ARA
In monetary terms, the absolute amount of money one would invest in risky assets
ARA>0
- reduce their monetary investment in risky assets as wealth increases
ARA<0
- increases their monetary investment in risky assets as wealth increases
ARA=0
- monetary investment in risky assets stays the same -> constant absolute risk aversion
RRA
Relative risk aversion: the percentage of wealth that one commits to risky assets
RRA >0
- reduce their % investment in risky assets as wealth increases -> increasing relative risk aversion
RRA < 0
- increase their % investment in risky assets as wealth increases -> decreasing relative risk aversion
RRA =0
- % stays constant as wealth increases -> constant absolute risk aversion
ARA formula
= -U’’(W)/U’(W)
RRA formula
= -WU’’(W)/U’(W)
Log function
U(W) = ln(W)
ARA => decreasing
RRA => constant
Quadratic fn
U(W) = a + bW - cW^2
ARA = increasing
RRA = increasing
Power fn
U(W) = -a + W^(1-b)
ARA = decreasing
RRA = constant
Exponential fn
U(W) = 1 - e^(-bW)
ARA = constant
RRA = decreasing
