Answer:
$579,000
Explanation:
The cash payment in September would be made of 35% purchases in September and 65% of the purchase made in August (the previous month).
Hence
Cash payment in September = (35% × $670,000) + (65% × $530,000)
= $579,000
the cash payment for September is $579,000
Answer:
MR = 10 – 1q1.
Explanation:
Demand function, P = 20 – 0.5Q
Q = q1 + q2
Now insert Q in the P = 20 – 0.5Q.
P = 20 – 0.5 (q1 + q2)
We have the value of q2 = 20.
P = 20 – 0.5 (q1 + q2)
P = 20 – 0.5 (q1 + 20)
P = 20 – 0.5q1 – 10
P = 10 – 0.5q1
Total revenue of firm 1, TR = Pq1
TR = 10q1 – (0.5q1)^2
Now MR is the differentiation of TR. So the MR after differentiation if TR of firm 1 is:
MR = 10 – 1q1
Answer:
Since the options were granted at an exercise price of $15 when the market value of the shares was $20, total compensation under the intrinsic method would be $5 per share on 1,000 shares or $5,000. Since the options are exercisable on 1/2/X2, the $5,000 in compensation would all be recognized n 20X1.
Explanation:
Answer: $2,400; $2,400
Explanation:
If a deposit of $6,000 is made, the reserve requirement is 20% so the bank will have to reserve this amount of:
= 6,000 * 20%
= $1,200
The bank will be left with:
= 6,000 - 1,200
= $4,800
The bank lends all of this out.
The public holds 50% of the currency so they will keep:
= 50% * 4,800
= $2,400
The rest - which is $2,400 - will be deposited as checkable deposits.
The present value (PV) of an annuity of P equal periodic payments for n years at r% is given by:
where
is the <span>present value of an annuity factor for n years at r%.
Given that </span>a<span>
company borrowed $40,000 cash from the bank and signed a 6-year note at
7% annual interest and that the present value of an annuity factor for 6 years
at 7% is 4.7665.
Then
Therefore, </span><span>the annual annuity payments equals $8,391.90</span>