Answer:
Roasted Olive should bake the bread in-house.
Because, It is cheaper to bake the bread in-house than to purchase as this saves $0.29 per loaf of bread.
Explanation:
Cost of Making
Unit Cost (Absorption Costing) = All Manufacturing Cost (Fixed and Variable)
= $0.52 + $0.24 + $0.70 + $0.96
= $2.42
Cost of Buying from Local Bakery
Note that the fixed costs are note avoidable, meaning that they would be incurred whether or not the bread is made internally or purchased from local Bakery
Cost of Purchase Option per unit :
Purchase Price $1.75
Add Fixed Overhead per loaf $0.96
Total unit cost $2.71
Conclusion :
It is cheaper to bake the bread in-house than to purchase as this saves ( $2.71 - $2.42) $0.29 per loaf of bread.
Therefore, Roasted Olive should bake the bread in-house.
Answer:
74 units and 90 units.
Explanation:
So, we have the demand for the first six months, K1 = 600 units = 600 units/ 6months = 100 units; the demand for the second six months, K2 = 900 units = 900/6 = 150 units; holding cost,J = $2 per unit ; process cost, P = $55 per order.
The formula for determining an order size that will minimize the sum of ordering and carrying costs for each of the six-month periods is the Economic Order Quantity formula which is given below;
Economic Order Quantity = √[ (2 × K1 × P)/ J ].
(1). For the first six months;
Economic Order Quantity = √ [ ( 2 × 100 × 55)/ 2].
Economic Order Quantity = 74 units.
(2). For the second six months.
Economic Order Quantity = √ [ ( 2 × 150 × 55)/ 2].
Economic Order Quantity = 90 units.
Answer:
The annuity is worth $4100.20 today and if we increase the rate of return, from 7% to 8% the value of the annuity falls to $3992.71.
Explanation:
The step by step solution for the given problem is attached with the image.
The value of annuity will decrease if we increase the rate of return, from 7% to 8%. Future cash flows are discounted using the rate of return, and the higher the discount rate, the lower the present value of the future cash flows.
Answer:
$826.95
Explanation:
To determine the price of Oil Wells' bonds, we can use the following formula:
bond price = semiannual coupon x [(1 - {1 / [1 + (maturity yield / 2)](years × 2)}) / (.0694 / 2)] + face value / [1 + (maturity yield / 2)](years × 2)
Bond price = $28.25 × [(1 - {1 / [1 + (.0694 / 2)](7 × 2)}) / (.0694 / 2)] + $1,000 / [1 + (.0694 / 2)](7 × 2)
Bond price = $757,92 + $69.03 = $826.95
Answer:
The change in the revenue is $100,000
Explanation:
The quantity when the price is $1.50 is 60,000(1.50)-10,000=80,000. The revenue when the price for the price of $1.50 is 1.50*80,000 = 120,0000.
Now for the new price of $2.00, the quantity is 60,000(2)-10,000=110,000, and the revenue is 2*110,000=220.000.
With the revenues from when the price is $1.50 and $2.00, the change is the diference $220,000-$120,000=$100,000.
When the price increases from $1.50 to $2.00 the revenue increases $100.000
