Answer:
e. None of the above assumptions would invalidate the model
Explanation:
Incomplete question "The constant growth model is given below: P0 = [D0(1 + g)]/[(rs - g)]"
According to dividend discount model,
P0 = D1/(R-G)
D1 - Dividend at t =1
R - Required rate
G - Growth rate
This would be invalid if R < G. In other words, Dividend growth model will be invalid in only one situation, that is, when growth rate is more than require return. In this situation growth model cannot be used.
Prices for airline tickets change on average about once per month. This would suggest that airline ticket prices are
Answer:
relatively flexible
Explanation:
Flexible pricing is when there is room for negotiation of prices of a product between the buyers and sellers.
So the price is prone to change in short amount of time.
Sticky price on the other hand tends to be non negotiable and the does not change over time.in the given scenario prices for airline tickets change on average about once per month.
So there is constant change of the price every month. Meaning the buyer can convince the seller to change his offering price.
The price is relatively flexible
A friend asks to borrow $635.52 today and promises to repay you $1,000 with interest compounded annually at 12%. How many years (compounding periods) will pass before you receive the payment
Answer:
4 years
Explanation:
We can calculate the years (compounding periods that) will pass before you receive the payment by calculating the PV factor at 12% as follows.
DATA
Amount borrowed = $635.52
future amount = $1,000
Interest rate = 12%
Time period (n) = ?
Solution
Amount borrowed = future amount x Present value factor (12%, n)
$635.52 = $1,000 x PV factor(12%, n)
0.63552 = PV factor(12%, n)
If you see in a discount table yu wi see 0.63552 in the fourth row of 12% rate that means it will take 4 years to receive the payment.
Project L costs $70,000, its expected cash inflows are $16,000 per year for 8 years, and its WACC is 13%. What is the project's discounted payback?
Answer:
6.89 years
Explanation:
The discounted payback period can be calculated by using the following table
Year Cash flows PV(13%) Cumulative Cash flows
0 (70000) (70000) (70000)
1 16000 14159.29 (55840.71)
2 16000 12530.35 (43310.36)
3 16000 11088.80 (32221.56)
4 16000 9813.10 (22408.46)
5 16000 8684.16 (13724.30)
6 16000 7685.10 (6039.20)
7 16000 6800.97 761.77
8 16000 6018.56 6780.33
Discounted Payback = 6 years + 6039/ 6801
Discounted Payback = 6.89 years