lizabeth, the manager of the medical test firm Theranos, worries aboutthe firm being sued for botched results from blood tests. If it isn't sued, thefirm expects to earn profit of $120, but if it is successfully sued, its profit will beonly $10. Elizabeth believes that the probability of a successful lawsuit is 20%. If fair insurance is available and Elizabeth is risk averse, how much insurancewill she buy? (Hint: Assume that Elizabeth starts with a wealth ofwand shebuys insurance coveringx≤ (120-10) = 110 of her loss. Write down herexpected utility as a function ofxand then take a derivative with respect toxto find the optimal insurance. If you want more hints, have a look at the secondinsurance problem solved in the lecture notes.)

Question

Sawyer

Mathematics

30 June, 01:39

lizabeth, the manager of the medical test firm Theranos, worries aboutthe firm being sued for botched results from blood tests. If it isn't sued, thefirm expects to earn profit of $120, but if it is successfully sued, its profit will beonly $10. Elizabeth believes that the probability of a successful lawsuit is 20%. If fair insurance is available and Elizabeth is risk averse, how much insurancewill she buy? (Hint: Assume that Elizabeth starts with a wealth ofwand shebuys insurance coveringx≤ (120-10) = 110 of her loss. Write down herexpected utility as a function ofxand then take a derivative with respect toxto find the optimal insurance. If you want more hints, have a look at the secondinsurance problem solved in the lecture notes.)

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Jacquelyn Buchanan · Answer 1

The value of variance is '0' at full insurance while expected profit therefore the individual will buy insurance $100

Step-by-step explanation:

Given that:

Elizabeth, the manager of the medical test firm Theranos, worries about the firm being sued for botched results from blood tests.

Earn Profit - $120

Successfully sued Profit - $10

Probability - 20% - 0.80

so that above data we shown in below table

Profit Probability

120 0.08

10 0.08

so that expected profit & variance under this situation are

expected profit = (120) (0.08) + (10) (0.80)

= 96+8

=104

expected profit = 104

Variance = (120-104) 2 (0.08) + (10-104) 2 (0.08)

= (256) (0.08) + (8836) (0.08)

= 9116.8

Variance = 9116.8

Further it is given that the individual is risk averse and is offered fair insurance since the probability loss is 20% so the fair insurance simples a premium of 0.08 for each dollar insurance coverage

so it is required to be determine how much insurance individual will buy

A fair insurance implies that the amount of insurance (coverage) bought has no impact on the expected values of individuals expected profit, but a higher insurance implies a lower variance

A lower variance is desired by a risk average individuals

Therefore in this a risk average individual will purchase full insurance because a full insurance would mean that the variance expected profiles will be minimized without any reduction in expected profit.

The individual faces a potential loss of 100 hence a full insurance would be an insurance of 100

since the probability loss is 20% the fair insurance implies a premium of 0.20 for each dollar of insurance

premium of 22 = (0.02*100) for full insurance

so individual buys full insurance, than she faces the following below table

Profit probability

104 (120-22) 0.98

104 (10-22+100 0.20

The expected profit variance

expected profit (104) (0.98) + (104) (0.20)

= 101. 92 + 20.8

=104

Variance (104-104) 2 (0.98) + (104) 4 (0.20)

= (0) 2 (0.98) + (104-104) 2 (0.20)

(0) 2 (0.98) + (0) 2 (0.20)

= 0+0

= 0

As shown above the value of variance is '0' at full insurance while expected profit therefore the individual will buy insurance $100