Answer:
$13,290.89 and $15,734.26
Explanation:
In this question we have to use the Present value function which is shown on the attachment below:
In the first case
Provided that
Future value = $0
Rate of interest = 12% ÷ 12 months = 1%
NPER = 48 months
PMT = $350
The formula is shown below:
= PV(Rate;NPER;PMT;FV;type)
So, after solving this, the present value is $13,290.89
In the second case
Provided that
Future value = $0
Rate of interest = 12% ÷ 12 months = 1%
NPER = 60 months
PMT = $350
The formula is shown below:
= PV(Rate;NPER;PMT;FV;type)
So, after solving this, the present value is $15,734.26
The value of the marginal product of any input is equal to the marginal product of that input multiplied by the: <u>market price</u> of the output.
<h3>How to find the marginal product?</h3>
The marginal product can be defined as the change that occur due to the addition of an output to a unit of input .
The value of marginal product can be calculated by making use of this formula
Value of Marginal Product = Marginal physical product × Average revenue price of the product.
Therefore the statement that complete the statement is market price of the output.
Learn more about marginal product here:brainly.com/question/14867207
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Answer:
Total contribution margin= $76,328
Explanation:
<u>First, we need to calculate the unitary contribution margin:</u>
Unitary contribution margin= 64,960 / 4,000
Unitary contribution margin= $16.24
<u>Now, the total contribution margin for 4,700 units:</u>
Total contribution margin= 16.24*4,700
Total contribution margin= $76,328
Answer:
$1,067,477.62
Explanation:
A fix Payment for a specified period of time is called annuity. The discounting of these payment on a specified rate is known as present value of annuity.
Formula for Present value of annuity is as follow
PV of annuity = P x [ ( 1- ( 1+ r )^-n ) / r ]
PV of annuity = $100,000 x [ ( 1- ( 1+ 8% )^-5 ) / 8% ]
PV of annuity = $1,067,477.62
According to my calculations, in order to be able to withdraw $100,000 from an annuity earning 8% at the end of each of the next 25 years, the amount you would need to deposit now would be $1,067,477.62.
Answer:
C) $10,000
Explanation:
The last interest payment was made on November 1, so by December 31, two months worth of interest is considered receivable.
Interest receivable = principal x interest rate x time periods = $500,000 x 12% x (2/12) = $10,000
By December 31, no principal payments had been done yet.
