Answer:
A) true
Explanation:
Compound interest can be regarded as
adding of interest gotten to the principal sum of a deposit or the principal sum of a loan. It's one that is gotten after reinvesting of ones interest instead of paying it out, as a result of this the interest that comes in
next period will be earned on the principal sum along with those interests accumulated before. It should be noted the process of earning compound interest allows a depositor or investor to earn interest on any interest earned in prior periods.
Answer:
There it is below
Explanation:
Given this product mix. what will the company's operating income be? ... the production of regular bins because the contribution margin per machine hour is higher. ... is less than it was when StoreAll was producing its optimal product mix. ... its optimal product mix because: the company had to produce less regular size bins ...
The amount of compensation expense Crane should record for 2017 under the fair value method is $207000
<u>Solution:</u>
From the given,
Stock options for 63000 shares
$10 par value common stock
$25 per share and the option price was $20
Total compensation expense = $627000
On calculating we get,
We can conclude that there is $207,000 decrease. Therefore, the correct answer is option c.
Answer:
EOQ= 300 units
Annual ordering cost= $3750
Annual holding cost =$3750
Re-order point =100 units
Explanation:
The Economic Order Quantity (EOQ) is the order size that minimizes the balance of ordering cost and holding cost. At the EOQ, the carrying cost is equal to the holding cost.
It is computed using he formulae below
EOQ = √ (2× Co× D)/Ch
EOQ = √ (2× 75× 15,000)/25
EOQ = 300 units
Annual holding cost
= EOQ/2 × holding cost per unit
= 300/2 × $25
=$3750
Annual ordering cost
= Annul demand/EOQ × ordering cost per order
=( 15,000/300)× $75
= $3750
Re-order Point
Maximum consumption × maximum lead time
=( 15,000/300)× 2 = 100 units
Answer:
A
Explanation:
The formula for calculating future value:
FV = P (1 + r)^n
FV = Future value
P = Present value
R = interest rate
N = number of years
Security A : 11 = 1( 1 + r)^15
11^(1/15) = 1( 1 + r)
1.173 = 1 + r
r = 1.173 - 1
r = 17.33%
Security A : 16 = 1( 1 + r)^15
16^(1/15) = 1( 1 + r)
1.20 = 1 + r
r = 1.2 - 1
r = 0.2
r = 20%
Security B earned a higher average annual rate of return as 20% is greater than 17.33%
