Answer:
Problems: For details refer below
Benefits: For details refer below
Explanation:
Problems associated with Burberry’s licensing arrangement in Japan
1) Licenser creates potential competitors
2) There is a lower control in licensee
Benefits of establishing a relationship with Sanyo Shokai in the country
1) Less costly as compare to Foreign direct investment
2) Responsibility can be shared with the third party
Answer:
The correct answer is letter "A": Histogram.
Explanation:
A Histogram is a graphic representation of grouped data in intervals. The data comes from quantitative variables. A histogram allows generating an idea of the distribution of the data or samples. Qualitative data can also be used but the amount of data must be large. This type of graph plots rectangular vertical bars together with proportional height to the intervals they represent.
Thus,<em> the project in the example can use a histogram to portrait its level of sales through the different seasons.</em>
Answer:
A transformation T: (x, y) (x + 3, y + 1). For the ordered pair (4, 3), enter its preimage point.
(-1, 2)
(1, 2)
(7, 4)
Explanation:
A transformation T: (x, y) (x + 3, y + 1). For the ordered pair (4, 3), enter its preimage point.
(-1, 2)
(1, 2)
(7, 4)
Answer:
14.78%
Explanation:
Drew's total investment = $23 x 100 = $2,300
during the year he received 4 dividend payments = 4 x 100 shares x $0.35 per share = $140
since the stock price increased, Drew's investment is now worth $2,500
if Drew was to sell his stocks, he would earn $200 + the $140 received as dividends = $340
Drew's annual return = $340 / $2,300 = 14.78%
Answer:
The optimal bundle is 6 pairs of dress shoes and 3 pairs of Crocs.
Explanation:
From the question,
Allowance (M) = $450; Price of dress shoes, Pd = $50; Price of crocs, Pc = $50
Note: MRS-price ratio, MUC- marginal utility from consuming casual Crocs ,MUD- marginal utility from consuming dress shoes
Optimal bundle is determined where MRS = Price ratio
MRS = MUC/MUD = 20DC/10C2 = 2D/C
Price ratio = Pd/Pc = 50/50 = 1
So, 2D/C = 1
Therefore, C = 2D
Budget constraint: M = Pd*D + Pc*C
So, 50D + 50*(2D) = 450
50D + 100D = 150D = 450
So, D = 450/150 = 3
C = 2D = 2*3 = 6
