Answer:
a) attached below
b) stable equilibria = x = 0.1 , x = 0.8
unstable equilibria = other value except 0.1 , 0.8
c) 0.5 , 0.6
Explanation:
Benefit of using the local roads = 1 + 8x - 9x^2
Benefit of using the free way = 3.6
a) Attached below is the required graph
<u>b) Determine The possible equilibrium traffic patterns from the graph </u>
stable equilibria : x = 0.1 , x = 0.8 ( this id because at these given value the benefits of using either routes is equal )
unstable equilibria : every other value of X except 0.1 and 0.8
<u>c) Determine the value of x that maximizes the total benefit to the population</u>
The value of X that maximizes the total benefit to the population = 0.5 and 0.6
attached below is the detailed solution
Transnet SOC Ltd is a rail, port, and pipeline company in Johannesburg.
Price: This company is a price maker, therefore, in terms of price, Transnet perfect compitetor is a price taker.
Output: Transnet has the ability to decide the quantity of their output and they have many competitors on this one.
<span>Profit: Transnet might be able to increase their profit but in a competition it would be hard because customers might switch to the competitor. </span>
Answer:
The answer is "venture capitalist".
Explanation:
The venture capitalists are a private equity adequate time and resources equity to companies with a high potential for growth in exchange for an equity stake. This might finance new companies or support local businesses that want to expand but don't have access to equity markets. It aims to generate returns to individual liability thru the financing of innovations and through the assistance of businesses.
Answer:
(a) If the Bills want to sell tickets to all 8 games by selling eight individual tickets, they have to set the price P = 120 − 10(8) = 120 − 80 = $40. This yields revenue of $40(8) = $320 from each fan.
(b) If the Bills practice second degree price discrimination, they can effectively charge
P = 120 − 10(1) = 120 − 10 = $110 for single games,
P = 110 + 100 + 90 + 80 = $380 = $95/ticket for a 4-game package, and
P = 110 + 100 + 90 + 80 + 70 + 60 + 50 +40 = $600 = $75/ticket for an 8-game package.
Answer: $25078
Explanation:
Firstly, we'll find the real interest rate which will be:
(1 + R) = (1 + r)(1 + h)
(1 + 10%) = (1 + r)(1 + 4.8%)
(1 + 0.1) = (1 + r)(1 + 0.048)
1.1 = (1 + r)(1.048)
r = 4.96%.
Now the annual deposit will be gotten by using the annuity future value which will be:
3 million = C(1.0496^40-1) / 0.0496
3 million = C(5.3995) / 0.0496
3 million = 119.627C
C = 3 million/119.627
C = 25078
Therefore, the real amount that must be deposited each year to achieve the goal is $25078
