The answer to the question is "MATRIX Structure".
The Matrix structure is a structure when the organization needs a stronger horizontal alignment or cooperation to meet goals, functionally designed organizations should adopt this structure. This type of structure is a combination of functional and divisional chains.
Answer:
cash 595,900 debit
bonds payable 590,000 credit
premium on bonds 5,900 credit
Explanation:
We have to record the issuance of the bonds:
<em><u>cash proceeds:</u></em>
face value x quote:
590,000 x 101/100 = 595,900
face value <u> (590,000)</u>
<em>premium </em> 5,900
<em>There is a premium as we are receiving more than we are going to pay at maturity.</em>
We will debit the cash proceeds form the bond
and credit the bonds and premium
Answer:
The total liabilities amounts to $200,000
Explanation:
The total liabilities of Asmine Smith is computed as:
Total Liabilities = Owing on Condo + Owning a Car
where
Owning on Condo is $190,000
Owning a Car is $10,000
Putting the values above:
= $190,000 + $10,000
= $200,000
Note: Sum Insured under the Insurance Policy, is neither a liability nor assets. And Premium paid is an expense, will be treated as Current Assets.
Answer: Supply curve - Increases rightwards
Market Price - Falls
Economic Profit - Decreases
Explanation: Perfect Competition market structure is with large number of buyers & sellers , homogeneous products & uniform prices , perfect information and free entry and exit.
'Free Entry and Exit' implies - no firm earns super normal (economic) profits or abnormal losses in long run. When firms are earning economic profits in short run, new firms enter (because of free entry) & the industry supply increase reducing price , which further reduces the super normal profits to normal profits in long run. Similarly - Abnormal losses make firms exit (freely), reduce supply & increase price , hence reducing abnormal losses & resuming normal profits.
Answer:
Break-even point in units= 770
Explanation:
Giving the following information:
Selling price= $500
Unitary variable cost= $260
Fixed costs= $184,800
<u>To calculate the break-even point in units using the mathematical equation, we need to use the following formula:</u>
<u></u>
Net income= unit contribution margin*x - fixed costs
x= number of units
0= (500 - 260)*x - 184,800
184,800/240 = x
770=x
<u>Now, under the unit contribution margin method:</u>
Break-even point in units= fixed costs/ contribution margin per unit
Break-even point in units= 184,800/240
Break-even point in units= 770
