6 lollipops.
3 candy bars.
1 candy bar and 4 lollipops.
2 candy bars and 2 lollipops.
Answer:
The Correct Option is C.
Explanation:
Vision is which a person see something either having a heavenly perspective or in the person or individual mind. Whereas the dream is what the person or individual see when the person or individual is asleep.
So, Jung believed that the dreams and the vision is important or vital form of communications from another domain.
Answer:
D) South American cocoa bean producers refuse to ship to chocolate producers in the US.
Explanation:
A nonbinding rice ceiling means that the equilibrium price is below the price ceiling, so it will have no effect in real life. In order for the price ceiling to become binding and start to negatively affect the market, the equilibrium price must increase.
The only option that would increase the equilibrium price is option D, since the shortage of a key input will probably result in an increase in the price of the key input. If the price of a key input increases, the cost of producing chocolate will increase, resulting in a leftward shift of the supply curve.
A leftward shift of the supply curve will decrease the total quantity supplied and it will increase the price of chocolate at every level of quantity demanded. This will result in an increase in the equilibrium price which might ultimately change the price ceiling from nonbinding to binding.
Answer:
0.087 = 8.7%
Explanation:
Present value of perpetuity given that payment is done at the end of N-year
= present value * ( 1 + i )^n-1
= 169 * ( 1 + i )^n-1 = 100 / i
∴ ( 1 + i )^n-1 = 100 / 169i ------- ( 1 )
Given that first payment at the end of N years = 2112.50 hence the present value of 2112.50
= 2112.50( 1 + i )^n-1 = 100 / i + 100/ i^2 --- ( 2 )
(given that the increment is with a difference of 100 ) and N-1 = number of years
next step : Input equation 1 into equation 2
2112.50 i^2 = 169i [ 100i + 100 ]
19350 i^2 = 16900i
∴ i = 16900 / 19350 = 0.086956 ≈ 0.087
Answer:
$138.63
Explanation:
I used an excel spreadsheet and the NPV function to determine the present value of this annuity. The present value of this annuity is $138.63