Continuous demand for insurance: What fraction of a person's potential losses will they choose to insure if they are free to choose any level of

Continuous demand for insurance: What fraction of a person's potential losses

will they choose to insure if they are free to choose any level of insurance?

Consider the following model. Sam has an income of W, and with probability p

experiences a loss of L =< W. An insurance company offers a range of insurance

policies. A policy that pays Sam I in the event of a loss can be purchased for a

premium of a*I. Sam must choose an insurance level I. After Sam makes his

choice, the loss is realized or not, and Sam consumes his available resources.

Sam's utility from consumption C is ln(C).

(a) Leaving I undetermined for now (i.e. just as a variable I, and not an

optimal choice), write down expressions for Sam's consumption if the loss

occurs and if the loss does not occur.

(b) Using these expressions, write down Sam's expected utility.

(d) What value of a would imply that the offered policy was actuarially fair?

(e) If offered insurance at this actuarially fair price, what insurance level I

would Sam choose?

(f) If a is higher than the actuarially fair level, will Sam choose full insurance,

partial insurance, or no insurance?