Answer: Loss of $22,000
Explanation:
Gain (loss) = Net Carrying Value of Bonds recalled - Price bond called at
Net Carrying Value of Bonds
= Par value - Unamortized discount
= 300,000 - 10,000
= $290,000
Gain (loss) = 290,000 - (300,000 * 104)
= ($22,000)
Answer:
The correct answer is A.
Explanation:
Giving the following information:
The estimated machine-hours for the upcoming year at 79,000 machine-hours.
The estimated variable manufacturing overhead was $7.38 per machine-hour
The estimated total fixed manufacturing overhead was $2,347,090.
To calculate the estimated manufacturing overhead rate we need to use the following formula:
Estimated manufacturing overhead rate= total estimated overhead costs for the period/ total amount of allocation base
Estimated manufacturing overhead rate= 2,347,090/79,000 + 7.38= $37.09 per machine-hour
Answer:
She lost $754.05.
Explanation:
Giving the following information:
Liz Mulig earns 52,000 per year as a philosophy professor. She receives a raise of 2.5% in a year in which CPI increases by 3.8%.
<u>The rise in her salary allows her to increase her purchasing power. On the contrary, inflation decreases purchasing power. We need to calculate the differences between both effects and determine whether she can buy more or less.</u>
<u></u>
Increase in salary= 52,000*1.025= $53,300
Inflation effect= 52,000/(1-0.038)= $54,054.05
To maintain her purchasing power, now, she needs to earn $54,054.05.
She lost $754.05.
Answer:
A. $0.90
Explanation:
Earning per share = (Net Income - dividends on preferred stocks)/average outstanding common shares
Particulars Amount
Earning After Tax 128750
Taxes 15000
Earning before Tax & Interest Expense 143750
Interest Expense (20000)
Earning after Interest, but before Tax 123750
Taxes (15000)
Earning after Taxes 108750
Preferred Dividends (18750)
Earning available for common stock holders 90000
common stock outstanding 100000
Earning per share 0.9
Therefore, The outstanding Earnings per share on the common stock was $0.90
Answer:
64,313.74 ; 95,559.38 ; 47,283.11
Explanation:
by definition the present value of an annuity is given by:

where
is the present value of the annuity,
is the interest rate for every period payment, n is the number of payments, and P is the regular amount paid. so applying to this particular problem, we have:
1. P=8,200, n=25, i=12%


2. P=8,200, n=25, i=7%


3. P=8,200, n=25, i=17%

