Answer:
0.4 swiss good(s) per U.S good(s)
Explanation:
firstly we calculate how many dollars we get per Frank so we will say $1/ 5 Swiss Franks =$0.2 which is similar to (5x =1, solve for x =1/5 / 0.2 in simple maths )per Swiss Franc thereafter we calculate the how many Swiss Francs per good compared to dollars per good we can get so therefore 2 Swiss Francs per good/$1 per good is the ratio of comparison , hence we treat f(X) as a function of swiss good(s) per U.S good, therefore f(X)= 2 x , knowing that x= 0.2 f(x)= 2(0.2) which will result in f(x)= 0.4.
Answer:
The correct answer is B.
Explanation:
Giving the following information:
Cash flow= $500
Number of months= 50
Monthly interest rate= 0.07/12= 0.00583
First, we need to calculate the future value using the following formula:
FV= {A*[(1+i)^n-1]}/i
A= cash flow
FV= {500*[(1.00583^50) - 1]} / 0.00583
FV= $28,928.06
Now, the present value:
PV= FV/(1+i)^n
PV= 28,928.06/(1.00583^50)
PV= $21,631.67
Answer:
The correct answer is the third statement which says to maximize profits, the firm should produce less than 500 units.
Explanation:
The quantity of output produced is 500 units.
The marginal cost of producing 500 units is $1.50.
The minimum average variable cost is $1.
The price of the product is $1.25.
The firm will be at equilibrium when the price is equal to marginal cost. To maximize profits firm should decrease output to the extent that marginal cost comes to $1.25. At that point, the firm will earn profits as average variable cost is lower than the price.
Research skills
(Time management is lower on the totem pole while the other 2 are on the bottom)