Answer:
1. Calculate the weighted scores for all brands.
Brand A score = (0.3 * 5) + (0.2 * 2) + (0.2 * 4) + (0.3 * 7)
= 4.8
Brand B score = (0.3 * 3) + (0.2 * 4) + (0.2 * 2) + (0.3 * 7)
= 4.2
Brand C score = (0.3 * 6) + (0.2 * 2) + (0.2 * 7) + (0.3 * 3)
= 4.5
2. Which brand would this consumer likely choose? Brand A
With the highest rating of 4.8, Brand A has the highest score and so will most likely be chosen.
3. Which brand is this consumer least likely to purchase? Brand B
With the lowest rating of 4.2, Brand B will be the least likely to be purchased.
Answer:
e. Statement of retained earnings.
Explanation:
Statement of retained earnings -
It refers to the financial statement , that defines the alterations in the retained earning , for a particular time period , is referred to as the Statement of retained earnings .
The statement mention the beginning and the ending retained earnings in the given time frame , which helps to calculates the corporate profit .
Hence , from the given information of the question,
The correct option is e. Statement of retained earnings .
Answer:
Stock price is $142.13
Explanation:
Given that:
Dividends (D) = $1.74
Dividend grow rate (g) = 25% = 0.25
Required return (R) = 12% = 0.12
Growth rate period (T) = 11 years
Perpetuity (p) = 6% = 0.06
Stock price = [D(1 + g) / (R-g)] {1 -[(1 + g) / (1 + R)]^T}+ [(1 + g)/(1 + R)]^T[D(1 + p)/(R-p)]
Substituting values:
Stock price = [1.74(1 + 0.25) / (0.12-0.25)] {1 -[(1 + 0.25) / (1 + 0.12)]¹¹}+ [(1 + 0.25)/(1 + 0.12)]¹¹[1.74(1 + 0.06)/(0.12 - 0.06)]
Stock price = [(-16.73) × (-2.34)] + [(3.35) ×(30.74)] = 39.1482 + 102.979 = $142.13
Stock price is $142.13
Answer:
not change
Explanation:
BEP (Units) = Fixed cost / (Unit selling price - Unit variable cost)
BEP (Units) Before the change is : 967750/ (30-17.75) = 79000 units
BEP (Units) after the change is: 1145500/(30-15.5) = 79000 units
--> BEP (Units) does not change
Answer:
B!
Explanation:
Healthcare depends on the job and benefits one receives. Often employers leave insurance to the employees own discretion and responsibility.
