Answer: The effect will be that the results will be distorted by registering a gain in the incorrect period, since 3 months correspond to the current year, from October-December and the rest corresponds from January-March of the following year.
The correct way to record these 3 months is as a liability (deferred income) when the income is realized they are taken to the income statement.
Answer:
Correct option is (b)
Explanation:
Price elasticity of demand is the law that states that proportion of percentage change in demand due to percentage change in price only and not any other factors. Demand is perfectly elastic if quantity demanded changes tremendously with change in price. Demand is inelastic if there is no change in quantity demanded with increase in price.
Here, Get smart university plans to increase tuition fees assuming that there will be no change in demand for the seats offered by the university due to increase in price. So, it assumes that demand is inelastic.
Answer:
$0 Gain or Loss
Explanation:
Given that,
Original cost of the equipment = $100,000
Accumulated depreciation on the equipment = $40,000
Book value of the equipment:
= Original cost of the equipment - Accumulated depreciation on the equipment
= $100,000 - $40,000
= $60,000
Gain/Loss = Sale value - Book value of the equipment
= $60,000 - $60,000
= $0
Therefore, the company should recognize a $0 Gain or Loss.
Answer:
the annual rate of return is 15.24%
Explanation:
The computation of the annual rate of return is shown below:
Given that
NPER = 5
PV = -$15,000
PMT = $4,500
FV = $0
The formula is shown below:
= RATE(NPER,PMT,-PV,FV,TYPE)
AFter applying the above formula, the annual rate of return is 15.24%
Answer:
First Financial would divide the $10,500 loan by the present value of annuity due of 1.
The correct answer is C
Explanation:
Present value of annuity formula is used for determining the amount of loan payment. Since the payments will be made at the beginning of each month, we will apply the formula for present value of annuity due. In order to determine the amount of monthly payment, we will divide the principal by the present value of annuity due of 1.