Answer:
A: 0.1475 , B: 0.3389
Explanation:
a. Probability Refrigerator purchased from store lasts more than 15 years :
Prob(refrigerator purchase from A) and Prob(refrigerator from A life > 15 years) + .........Prob(refrigerator purchase from D) and Prob(refrigerator from D life >15 years)
(0.40x0.1)+(0.25x0.20)+(0.15x0.05)+(0.20x0.25) = 0.04+0.05+0.0075+0.05 = 0.1475
b. Refrigerator last > 15 years given , Probability it is from B :
[ Prob (B Purchase) . Prob (life > 15, given from B) ] / Prob (Life > 15)
P (B/15) = [P(B).P(15/B)] / [P15] {Bayes Theorum}
= [(0.25)(0.20)] / 0.1475 = 0.05 / 0.1475
= 0.3389
Answer:
Revocation
Explanation:
Based on the information given She is able to do this because she has the right of REVOCATION which means the right to cancel , terminate, withdraw or bring a contract to an end due to some reason just as the case of Shawna and Philip's in which we were told that Shawna had a second thought on wheither Philip's will have the ability to pay her for the services she is about to rendered to him by deciding to calls Philip in order to withdraw her offer before Philip accepts it.
Therefore Shawna is able to withdraw her offer because she has the right of REVOCATION
Cost per unit
(300,000÷15,000)+20=40
Current profit
50×15,000−40×15,000=150,000
Profit change
60×15,000−40×15,000=300,000
units will knoll need to sell for profit to remain the same as before the price change is
(150,000+300,000)÷40=11,250
Answer:
Option a
Explanation:
In simple words, event refers to a potential situation that may or may not happen in the future and the occurrence or non occurrence of which depends on various factors in which some can be controlled by the affected party in advance and some are not.
These events could be either threat or opportunity. Although by using specialized knowledge these could be predicted at a certain level but its occurrence could not be guaranteed,
Answer:
a. $49,933,333.33 million
b. $48,533,333.33 million
Explanation:
The computations are presented below:
a. For current profits as dividends in before case
= Profits × (1 + opportunity cost) ÷ (opportunity cost - growth rate)
= $1,400,000 × (1 + 0.07) ÷ (0.07 - 0.04)
= $1,400,000 × 35.6666
= $49,933,333.33 million
b. For current profits as dividends in after case
= Profits × (1 + growth rate) ÷ (opportunity cost - growth rate)
= $1,400,000 × (1 + 0.04) ÷ (0.07 - 0.04)
= $1,400,000 × 34.6666
= $48,533,333.33 million
