Answer:
a. $0.98
b. 6,000 container
Explanation:
a. The computation of the incremental contribution margin per container is shown below:
= Drop selling price - total variable manufacturing cost - drop selling price × sales commission - sale value in raw form × basis
= $4.40 - $0.95 - $4.4 × 5% - 3 × 3 ÷ 4
= $0.98
b. The minimum number of containers of candy sold each month is
= (Per month salary paid to sales person + Master candy maker salary) ÷ ( incremental contribution margin per container)
= ($2,000 + $3,880) ÷ $0.98
= 6,000 container
We simply applied the above formulas so that the a and b part could arrive
I believe the answer is:
1/Retirement plans
Especially the one that arranged by the government since it guaranteed by Federal banks
2/Property
The value would almost always increasing over time
3/A-rated bonds
A- rated bonds is score that given to the bond that have strong chance of return by credit rating company
4/Speculative stocks
If speculative stocks is scored by rating company, it would become B-rated or lower.
Answer:
Price of bond=948.8583731
Explanation:
<em>The value of the bond is the present value(PV) of the future cash receipts expected from the bond. The value is equal to present values of interest payment plus the redemption value (RV).
</em>
Value of Bond = PV of interest + PV of RV
Semi-annual interest = 8.6% × 1,000 × 1/2 =43
Semi-annual yield = 9.4%/2=4.7
%
<em>PV of interest payment</em>
PV = A (1- (1+r)^(-n))/r
A- 43, r-0.047, n- 20
= 43× (1-(1.047)^(-10)/0.047)
= 549.7724893
<em>PV of redemption Value</em>
PV = F × (1+r)^(-n)
F-1000, r-0.047, n- 20
PV = 1,000 × 1.047^(-20)
PV = 399.0858837
Price of Bond
549.772 + 399.085
=948.8583731
Answer: A. the 99 principle
Explanation:
This strategy, often called "charm pricing," involves using pricing that ends in "9" and "99."
With charm pricing, the left digit is reduced from a round number by one cent. We come across this technique every time we make purchases but don’t pay attention. For example, your brain processes $3.00 and $2.99 as different values: To your brain $2.99 is $2.00, which is cheaper than $3.00.
How is this technique effective? It all boils down to how a brand converts numerical values. In 2005, Thomas and Morwitz conducted research they called "the left-digit effect in price cognition." They explained that, “Nine-ending prices will be perceived to be smaller than a price one cent higher if the left-most digit changes to a lower level (e.g., $3.00 to $2.99), but not if the left-most digit remains unchanged (e.g., $3.60 to $3.59).”
