Assuming that you have the values for the year 2017, the break-even point would be 1500 units for the year 2017. To calculate this, we use the idea that at the breaking point, total sales is equal to the total cost or expenses made. Which would be:
selling (x) = fixed + variable (x)
x = fixed / (selling - variable)
x = 270000 / (600-420)
x = 1500 units
Answer:
b. If the employer accepts Turner's counteroffer, Turner will recognize as gross income $55,000 per month [($480,000 + $180,000)/12].
Explanation:
Given that
Turner annual salary = $600,000
Counteroffer to received a monthly salary = $40,000 or $480,000 annually
And, $180,000 bonus in 5 years at the age of 65
So the benefit he will be getting would be after accepting the counter offer is
= ($480,000 + $180,000) ÷ 12 months
= $660,000 ÷ 12 months
= $55,000
Answer:
The amount of the fee is $1689.60
Explanation:
The computation of the amount of the fee is shown below:
= Dollar value × fund charges a 12b-1 fee
= $211,200 × 0.8%
= $211,200 × 0.008
= $1689.60
Since the question has asked the fee amount so we consider the fee charges percentage, not the capital investment Lifecycle fund. Thus, we ignore the Capital Investments Lifecycle Fund as it is not relevant.
Hence, the amount of the fee is $1689.60
Answer:
The correct answer is:
Selling furniture to appliance customers.
Explanation:
In this case, the company can take advantage of the fact that consumers who buy furniture for their homes are usually interested in the line of appliances. This is a very good strategy, because in this manner they will realize about the need or desire at the same time this fact will have good consequences, so that they can make a single purchase and a single shipment, giving them the feeling of saving a lot leading them to Buy more in the store. Therefore, using this strategy the company will have more cash flow in this way.
Answer:
annual payment = $2,362.88
Explanation:
we must first calculate the future value of the loan at the end of year 4 = $6,226 x (1 + 11%)⁴ = $9,451.51
using the present value of an annuity formula we can determine the annual payment:
annual payment = present value of an annuity / PV annuity factor
- present value of an annuity = $9,451.51
- PV annuity factor 11%, 4 periods = 3.1024
annual payment = $9,451.51 / 3.1024 = $2,362.88
