<span>Martin should look at the company balance sheet as of the end the last accounting period to see the cash balance on the last day of the accounting period.
Jennifer should look at the company cash flow statement as of the end of the last accounting period to see the sources and uses of cash during the accounting period.</span>
Answer:
$99,500
Explanation:
Adjusted gross income before considering the rental loss $118,000.
Less generated a loss of $18,500
Adjusted gross income $99,500
Carlos qualifies under the real estate professional exception due to the fact that he spends more than 50% of his personal service time in real property trade and the amount of time spent in real property trade is higher than 750 hours, he is as well the sole owner and spends more than 100hours.
Therefore the rental activity is not considered passive and he is allowed to offset the $18,500 loss against his active and portfolio income which is why Carlos'sadjusted gross income after considering the loss is $99,500 ($118,000 -$18,500)
All that information gives you three points to make the graph.
Point 1:
At the price of $10, the offer is 2*1,000 shoes => (10, 2,000)
At the price of $25, the offer is 10*1,200 shoes => (25, 12,000)
At the price of $40, the offer is 10*1400 + 4*500 => (40, 16,000)
Then you have three points. You can check that their are not aligned because when you increase the price $15 from 10 to 25 the offer increases in 10,000 shoes; but when you increase the price $15 from 25 to 40, the offer increases 4,000.
To draw the grpah:
- use a perpendicular coordinate system with the price in the horizontal axis and the offer in the vertical axis,
- lable the horizontal axis with the prices from 10 to 50 and the vertical axis with the offers from 1,000 to 18,000.
- draw the three calculated points (10; 2,000) , (25; 12,000) and (40; 16,000)
- draw a curved line that passes through the three points.
Ther you have the graph.
Answer:
Periodic payment = $3,881.88 (Approx).
Explanation:
Given:
Present value of annuity = $36,500
Rate = 6.5% = 0.065
Number of payment = 15
Computation:
![Present\ value\ of\ annuity = periodic\ payment[\frac{1-(1+r)^{-n}}{r} ]](https://tex.z-dn.net/?f=Present%5C%20value%5C%20of%5C%20annuity%20%3D%20periodic%5C%20payment%5B%5Cfrac%7B1-%281%2Br%29%5E%7B-n%7D%7D%7Br%7D%20%5D)
![36,500 = periodic\ payment[\frac{1-(1+0.065)^{-15}}{0.065} ]\\\\36,500 = periodic\ payment[\frac{1-(1.065)^{-15}}{0.065} ]\\\\36,500 = periodic\ payment[\frac{1-0.388826524}{0.065} ]\\\\36,500 = periodic\ payment[\frac{0.611173476}{0.065} ]\\\\36,500 = periodic\ payment[9.40266886 ]\\\\periodic\ payment = 3,881.87658](https://tex.z-dn.net/?f=36%2C500%20%3D%20periodic%5C%20payment%5B%5Cfrac%7B1-%281%2B0.065%29%5E%7B-15%7D%7D%7B0.065%7D%20%5D%5C%5C%5C%5C36%2C500%20%3D%20periodic%5C%20payment%5B%5Cfrac%7B1-%281.065%29%5E%7B-15%7D%7D%7B0.065%7D%20%5D%5C%5C%5C%5C36%2C500%20%3D%20periodic%5C%20payment%5B%5Cfrac%7B1-0.388826524%7D%7B0.065%7D%20%5D%5C%5C%5C%5C36%2C500%20%3D%20periodic%5C%20payment%5B%5Cfrac%7B0.611173476%7D%7B0.065%7D%20%5D%5C%5C%5C%5C36%2C500%20%3D%20periodic%5C%20payment%5B9.40266886%20%5D%5C%5C%5C%5Cperiodic%5C%20payment%20%3D%203%2C881.87658)
Periodic payment = $3,881.88 (Approx).
the answer is B) bookkeeper
