Answer:
North Company
Budgeted multiple-step income statement for the year ending December 31, 2020
Sales of $2,228,200
Cost of Goods Sold ($24 x 50,160) <u>($1,203,840)</u>
Gross Profit $1,024,360
Operating Expenses:
Selling and administrative expenses <u>($309,200)</u>
Operating Income $715,160
Non-Operating Expenses:
Interest Expense <u>($12,710) </u>
Operating Income before tax $702,450
Income taxes <u>($226,800)</u>
Operating Income after Tax <u> $475,650</u>
Explanation:
Multi-step Income statement segregate the Operating Income and Expenses from non operating Income and Expense. It shows the gross profit and net operating income separately.
Answer:
He has to deposit $750.46 every month into the account
Explanation:
Future value id the accumulated amount of principal and compounded interest at the end of a specific investment period.
Assuming interest is compounding every month, use following formula to calculate the amount of payment each month.
FV = PV x ( 1 + r )^n + A x ( ( 1 + r )^n - 1 ) / r
$57,000 = $10,000 x (1+0.1%)^5x12 + A x ( ( 1+0.1% )^5x12 -1 ) / 0.1%
A = { $57,000 - [ $10,000 x ( 1 + 0.001 )^60 ] } / [ ( ( 1 + 0.001 )^60 )-1 / 0.001 ]
A = ( $57,000 - $10,618.05 ) / 61.80471
A = $46,381.95 / 61.80471
A = $750.46
Answer:
$24.18
Explanation:
Dividend for year 0 = $2.2
Dividend at year end 1 = $2.2
Dividend at year end 2 = $2.2(1 + .05) = 2.31
Dividend at year end 3 = $2.31 (1 + .05) = 2.4255
Dividend at year end 4 = $2.4255 (1 + .17)= 2.8378
Dividend at year end 5 = $2.8375 (1 + .09)= 3.0932
Dividend at year end 6 = $3.0932 (1 + .09) = 3.371
MPS = ![\frac{D_{1} }{(1\ +\ k)^{1} } + \frac{D_{2} }{(1\ +\ k)^{2} } \ +\ \frac{D_{3} }{(1\ +\ k)^{3} } \ +\ \frac{D_{4} }{(1\ +\ k)^{4} } +\ \frac{D_{5} }{(1\ +\ k)^{5} } \ + \frac{1}{(1\ +\ k)^{5} } [\frac{D_{6} }{(k\ -\ g)\ ]}](https://tex.z-dn.net/?f=%5Cfrac%7BD_%7B1%7D%20%7D%7B%281%5C%20%2B%5C%20k%29%5E%7B1%7D%20%7D%20%20%2B%20%5Cfrac%7BD_%7B2%7D%20%7D%7B%281%5C%20%2B%5C%20k%29%5E%7B2%7D%20%7D%20%5C%20%2B%5C%20%5Cfrac%7BD_%7B3%7D%20%7D%7B%281%5C%20%2B%5C%20k%29%5E%7B3%7D%20%7D%20%5C%20%2B%5C%20%5Cfrac%7BD_%7B4%7D%20%7D%7B%281%5C%20%2B%5C%20k%29%5E%7B4%7D%20%7D%20%20%2B%5C%20%5Cfrac%7BD_%7B5%7D%20%7D%7B%281%5C%20%2B%5C%20k%29%5E%7B5%7D%20%7D%20%5C%20%2B%20%5Cfrac%7B1%7D%7B%281%5C%20%2B%5C%20k%29%5E%7B5%7D%20%7D%20%20%5B%5Cfrac%7BD_%7B6%7D%20%7D%7B%28k%5C%20-%5C%20g%29%5C%20%5D%7D)
where MPS = Market price of share
D= Dividend for different years
k = Cost of equity
g= constant growth rate after year 5
putting values in above equation we get,
MPS = 1.864 + 1.65 + 1.478 + 1.463 + 1.352 + 0.4371 × 37.462
MPS = $24.18
The maximum price per share that an investor who requires a return of 18% should pay for Home Place Hotels common stock is <u>$24.18</u>
Generally speaking, a
business message expressing negative news (reader will react negatively) should
be organized indirectly. The message should be delivered among other
information and should not stand out. This is only appropriate if it is
practical to deliver the message in this way (immediate action is not
required). A more positive message should be prominent in the communication and
expressed in a more direct way, since it is assumed that the reader will react
positively.
Answer:
Laffer curve.
Explanation:
Laffer Curve is developed by
Arthur Laffer. It is used to show the relationship between tax rates and the amount of tax revenue collected by governments of a particular country. Laffer curve is used to demonstrate Laffer’s argument that sometimes cutting tax rates can increase total tax revenue.
Laffer curve shows the relationship that occurs between the tax rate and the amount of tax revenue collected
The relationship between the tax rate and the amount of tax revenue collected is called the LAFFER CURVE curve. This curve shows that TAX CUT CAN INCREASE TAX REVENUE.
The drawing of a laffer curve has been attached
