The role that the idea of machine plays in contructivist settings include: RAMPS, PLATFORM AND STAIRWAYS.
In theater, a contructive setting is one which is highly theatrical, has practical apparatus for actors to manipulate and it also has skeletal frame. A construtive setting can easily be manipulated.
Based on efficiency, the businesses that should cut hair are the A and C; moreover, to meet the demand, each firm will need to offer at least two haircuts.
The supply of a product or the units of a product that is offered to potential customers should always meet the number of real customers. In the same way, the price of the product should meet the price customers are willing to pay.
In this context, the best is that only firm A and C cut hair, this is because their prices per cut ($25 and $30) match the consumers' willingness to pay this includes Lorenzo ($35), Gilberto ($50), Juanita ($40) and Neha ($25).
- Firm A can cut Neha's and Lorenzo's hair
- Firm C can cut Gilberto's and Juanita's hair
Moreover, this implies each firm needs to do at least 2 haircuts to cover all the possible customers.
In the case of firms B and D, the price per cut is high ($40 - $45). Based on this, they should not cut hair as only a few customers can pay for this service, and this would be inefficient.
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<span>Assets - equity = liabilities
So liability before the increase is:
300, 000 - 100, 000 = 200, 000
And if assets increases by 80, 000. Hence new assets = 380, 000. Liabilities increases by 50, 000; hence new liability = 250, 000.
New Equity = New Assets - New liability.
New Equity = 380, 000 - 250, 000 = 130, 000.</span>
Answer: BB
Explanation:
Because the credit help the company BB to run over and to make monney.
Answer:
The correct answer is $65.90 (approx.)
Explanation:
According to the scenario, computation of the given data are as follows:
Dividend paid = $8.50
Increase dividend = $6.50 per year
Require return = 16%
We can calculate the current share price by using following method:
=[($8.5 + $6.5) ÷ (1 + 16%)^1] + [($8.5 + $6.5 + $6.5) ÷ ( 1 + 16%)^2] +[($8.5 + $6.5 + $6.5 + $6.5) ÷ (1+16%)^3] + [($8.5 + $6.5+ $6.5 + $6.5 + $6.5) ÷ (1+16%)^4
= $15 ÷ 1.16 + $21.5 ÷ 1.16^2 + 28 ÷ 1.16^3 + 34.5 ÷ 1.16^4
= $65.90 (approx.)
