Answer:
X= cost of the tires
t(x)= (.9*X+10)*1.06
If x = 300, then the costo is (.9*300 + 10) *1.06 = (270 + 10)* 1.06 = 280 * 1.06 = $296.80
If the tax is appplied first and then the discount is applied, your formula would be:
t(x) = (x+10)*1.06 - (-1*x)
If x is equal to $300, the cost is $310 * 1.06 - .1*300 = $328.60 - $30 = $298.60
you pay mor if the tax is applied first.
Your discounted price of .9*x stems from x - .10*x which becomes (1-.10)*x wich becomes .9*x
Your cost with tax stems from y + .06*x =(1+.06)*y = 1.06*y
Y is the amount of the cost that is taxed.
if the discuount is applied first, then y is equal to (.9*x + 10)
if the discount is applied after, then y is equal to (x+10).
The difference is the tas on the discount
Explanation:
Answer:
The return you expect in U.S. dollars is 1.116%
Explanation:
0.85 = 0.93 ( 1+0.02/1+X)
0.85/0.93 = 1.02/X
0.913978 = 1.02/X
X = 1.02/0.913978
= 1.116%
Therefore, The return you expect in U.S. dollars is 1.116%
Answer:
c. An NPV profile graph is designed to give decision makers an idea about how a project's contribution to the firm's value varies with the cost of capital.
Explanation:
NPV is Net Present Value of a project. It basically calculates the entire return on project. It is the discounted value of the net returns of the project. Its graph basically demonstrates the contribution of the project, and its difference in cost of capital.
It clearly assumes to add value to the company's contributions if it is more than 0, accordingly the returns are more than cost of capital if NPV is more than 0.
<span>A.) Jessica is low risk and will pay her outstanding balances on time.</span>
Answer:
The correct answer is B. brand community
.
Explanation:
A brand community refers to a group of people who share a strong liking for a brand and create teams to share and discuss its usefulness, use it, and serve as an advertisement to others. In the case of Barrum motorcycles, its brand community is mainly made up of bikers who make trips and events to publicize the benefits of using their motorcycles.