Answer:
a. Leslie, who is independent and self-confident. She doesn’t need people to tell her what to do.
b. Malcolm, who loves to play. His last boss says that Malcolm was the "chief kid" in his last office.
c. Frankie, who has been in the toy business for 10 years and who knows what he’s doing, but who always likes testing a new idea.
Explanation:
In this scenario the CEO of a start-up toy manufacturer wants to create at least 10 wildly different toys in the next three years.
He will primarily need people that are creative and are inclined to work with new ideas.
The wrong choice will be someone who follows the rules and is stable. Such a staff will not contribute new ideas that will move the company to make profits.
Leslie is confident and does not need to be told what to do, so she will take initiative to do new things.
Malcolm loves to play and this will boost creative ideas.
Frankie likes testing new ideas and will be comfortable working creatively.
Answer:
The answer is b) people who have a more inelastic demand for amusement parks.
Explanation:
For this price discrimination strategy, amusement parks are aiming at people who are more willing to come to the amusement park to spend more hours at the park and does not care about entry price as much as other people who are not normally willing to visit the park; instead, may be take a try for one or two hours at the end of the day at deep discounted price.
So, high price will be charged to people less care about entry price, in other works their demand for the amusement parks is relatively more inelastic to other people.
Thus, b is the right choice.
Answer:
expansion should be undertaken as it has a positive net present value
Answer and Explanation:
The computation of the effect on real GDP is shown below:
change in GDP is
= Multiplier × change in investment
= 1 ÷ (1 - MPC) × change in investment
= 1 ÷ (1 - 0.65) × $150 billion
= 2 × $150 billion
= $300 billion
And, the marginal propensity to consume is
= Change in spending of consumer ÷ income change
= (2,100 - 1,200) ÷ (4,000 - 3,000)
= 900 ÷ 1,000
= 0.9
