Answer: One of the costs of not having insurance is the cost of repairing. Another cost is paying insurance premiums. Losses caused by a lack of insurance are the price of not having insurance.
W(-7,-4) indicates the reflection across y=x. (x,y) transformed to (y,x). w(-7,-4) =w(7,4).
w'(7,-4) indicates the reflection across y-axis. (x,y) is transformed to (-x,y). w(-7,-4) = w(7,-5).
Explanation:
The rules for reflecting over the X axis is to negotiate the value of the y coordinate of each point and x is same.
After reflection the coordinates of the figure can be determined. If you reflect over the x-axis, then keep the x-coordinate and take the opposite of y- coordinate. If you reflect over y-axis, then take the opposite of x- coordinate and keep y- coordinate.
Answer:
C) No/Yes
Explanation:
An income statement (profit and loss account) is one of the financial statements of a company and shows the company’s revenues and expenses during a particular period. It indicates how the revenues are transformed into the net income or net profit
Absorption cost is a method of calculating the cost of a product or enterprise by taking into account indirect expenses (overheads) as well as direct costs.
How do you calculate total period cost under absorption costing?
Income statement shows Sales – Cost of Goods sold = Gross Margin (or Gross Profit) – Operating Expenses = Net Income and is based on the number of units SOLD.
Answer:
(D) is the same and output is lower than in the original long-run equilibrium.
Explanation:
In the long term the prices are flexible. They adapt to the new situation of a decrease in the demand. This is consistent with with a lower output, consecuences of the decreasing in the demand.
Answer: 15
Explanation:
For profit to be maximized by a monopolist, the marginal revenue and marginal cost must be gotten.
P= 105-3Q
MC= 15
Since total revenue is price × quantity, TR= P×Q = (105-3Q)Q
= 105Q-3Q^2
MR= 105-6Q
Since we've gotten marginal revenue and marginal cost, we equate both together.
MR=MC
105-6Q = 15
6Q = 105-15
6Q=90
Divide both side by 6
6Q/6 = 90/6
Q= 15
The quantity that will maximise profit is 15
