<u>Answer:</u>
bulk
<u>Explanation:</u>
The Tomatoes are produced in a bulk and the canned products are sent out in batches but the process of moving tomatoes from receiving through packaging and processing is done on a conveyor belt which is a continuous process.
Therefore, the production of tomatoes in a bulk is a continuous process which goes on around the clock on a conveyor belt and the final products are sent out in batches which have their own unique identity number.
Answer:
4 years
Explanation:
Payback period is the time in which a project returns back the initial investment in the form of net cash flow.
Initial Investment = $280,000
Net Income = $20,000
To calculate the net cash flows add bask the depreciation expense in Net income each year.
Depreciation = ($280,000 - $30,000) / 5 = $50,000
Net Cash Flow = $20,000 + $50,000 = $70,000
Payback period = Initial Investment / yearly cash flow = $280,000 / $70,000 = 4 years
Answer:
$200 (million)
Explanation:
If the government spending increases by $200 million, then associated change in equilibrium income will be $ 200 million, assuming that Marginal Propensity to Consume (MPC) is 1
Answer:
113,000.
Explanation:
Let go through all the items to see whether we need to include them in the initial outlay or not.
(1) $100,000 worth of equipment => Yes
(2) Shipping will cost $5,000 and installation will cost $8,000 => Yes (Add to purchase price of equipment)
(3) Paid a management consultant $4,000 to analyze this project => No =>This is sunk cost (already incurred regardless of accept or reject the prject)
(4) Increase sales by $20,000 per year => No => under operating cashflow.
(5) $3,500 to train the employees to use the new equipment => No => under operating cashflow.
So, total initial outlay = 100,000 + 5,000 + 8,000 = 113,000.
Answer:
X (the variable on the horizontal axis) will increases by 2.
Explanation:
The slope of a straight line is -3. So, m=6.
Slope of a straight line is
Y (the variable on the vertical axis) decreases by 6.
Change is y = -6
We need to find the change in (the variable on the horizontal axis).
Substitute the given values in the above formula.
Note: All options are incorrect.
Therefore, X (the variable on the horizontal axis) will increases by 2.
