I'd rather use my Saving but Getting a loan from family or friend is Kinda Nice if they have the money for it. but Borrowing from a Bank is Smart But Do You Even Have enough money in you're bank for it?
Answer: 10% or $2,000,000
Explanation:
Seeing as no figures were produced, we will have to do this ourselves.
We will make assumptions which include the following,
Life of the equipment = 10 Years
Salvage value = 0
Those are our 2 assumptions.
In that case then,
The Annual Depreciation will be,
Depreciation = (Cost of equipment - Estimated salvage value) / Estimated useful life
= (20 - 0) / 10
= $2 million
Seeing as 2 million is,
= 2/20 * 100
= 10%
That would mean that annual depreciation costs at that facility will rise by $2 million or 10%.
If you need any clarification do react or comment.
Answer:
B. who can immediately take over the family business
Explanation:
<em>Option A</em> is wrong because opportunity cost is not related to intelligence.
<em>Option C</em> is not correct because a high school graduate and a college attending student can access to student loans.
The family's wealth can not be a factor in terms of opportunity cost of attending college or a high school graduate. Therefore, <em>option D</em> is incorrect.
Option B is correct as a college attending student cannot take over the family business. So, it is his opportunity cost. On the other hand, a high school graduate can take over the business.
Answer and Explanation:
Given:
Product 1 Product 2 Product 3
Cost of product $20 $90 $50
Selling price $40 $120 $70
Selling cost $6 $40 $10
Computation:
Product 1 Product 2 Product 3
Product Cost $20 $90 $50
N.R.V ($40-$6)=$34 ($120-$40)=$80 ($70-$10)=$60
Per Unit Inventory Value $20 $90 $50
Answer:
Option d would be the appropriate choice.
Explanation:
- At either the vertices including its continuum that ranges exist the optimal solutions towards linear programming challenges. Throughout this instance, the feasible area is just the section between some of the blue as well as red sections of the green map.
- The green squares that describe the point of convergence between some of the red or green outlines seem to be the optimal solution.
Some other choices don't apply to the specified situation. So, the best one is the one mentioned.
