Answer:
Net Present Value = $660.98
Explanation:
<em>The Net present value (NPV) is the difference between the Present value (PV) of cash inflows and the PV of cash outflows. A positive NPV implies a good and profitable investment project and a negative figure implies the opposite. </em>
NPV of an investment:
NPV = PV of Cash inflows - PV of cash outflow
<em>PV of cash inflow = A× (1- (1+r)^(-n))/r
</em>
A- annul cash inflow, r- 8%, n- 3
PV of cash inflow= 41,000× (1- 1.08^(-3))/0.08
= 105,660.98
Initial cost = 105,000
NPV = 105,660.98 - 105,000
= $ 660.98
Answer:
$423,000
Explanation:
Initial accounts payable added to any purchases made during the period must equal ending accounts payable plus cash payments. Therefore, the amount of budgeted cash payments is:

The amount of budgeted cash payments is $423,000.
Answer:
See below
Explanation:
Given the above information, we can compute variable manufacturing overhead efficiency variance to be;
= (SA - AQ) × SR
Where
Standard quantity = SQ = 19,000
Actual Quantity = AQ = 7,600
Standard Rate = SR = $1.9
Variable manufacturing overhead efficiency variance
= [(19,000 × 0.3) - 7,600] × $1.9
= (5,700 - 7,600) × $1.9
= $3,610 U
Answer:
58.81% annual
or 3.93% monthly
Explanation:
Using a financial calculator, we can determine the internal rate of return of this investment. The initial outlay is -$110,000, and the 60 $4,800 cash flows follow. The IRR is 3.93 per month. In order to determine the effective annual rate, we can use the following formula:
effective annual rate = (1 + 3.93%)¹² - 1 = 58.81%
I would assume inside of an office building with cubicles.