Answer:
They should invest $5,119,047.619 today.
Explanation:
The trust fund will pay a fixed amount forever thus it is a perpetuity. The value of perpetuity or Price of perpetuity is the amount that the perpetuity is worth in today's terms based on the cash flows it will generate in future.
The formula for the value or price of perpetuity is,
P0 or V = Cash Flow / r
Thus,
P0 or V = 215000 / 0.04 = $5,119,047.619
Answer:
June 30, 2020 Bond Interest expense Debit $5,756.25
Discount on Bonds payable Credit $506.25
Cash Credit $5,250
Explanation:
We have to calculate the interest expense. The bond interest expense = Cash payment + bond amortization discount
Given,
Bond price = $150,000
Interest = 7%
Number of period, n = 10 years × 2 (As it is a semiannual bond) = 20
Cash payment for semiannual interest = $150,000 × 0.07 × (1÷2)
Cash payment for semiannual interest = $5,250 (Credit)
Amortized bond discount (discount on bonds payable) = $10,125 ÷ 20 (as it is a semiannual payment and $10,125 is for 10 years)
Discount on bonds payable = $506.25 (Credit)
Therefore, bond interest expense = $5,250 + $506.25 = $5,756.25 (Debit)
Answer:
Break-even point (dollars)= $574,000
Explanation:
Giving the following information:
Selling price per unit $ 200.00
Variable expense per unit $ 58.00
Fixed expense per month $ 407,540
<u>To calculate the break-even point in dollars, we need to use the following formula:</u>
Break-even point (dollars)= fixed costs/ contribution margin ratio
Break-even point (dollars)= 407,540 / [(200 - 58)/200]
Break-even point (dollars)= $574,000
Answer:
Not change
Explanation:
In the long run we expect firms to earn zero profits. With competitive markets for both inputs and output, and with constant returns to scale, a doubling of all inputs would lead to twice as much output, twice as much revenue, and twice as much cost.
