As long as the rate of return is bigger than the inflation, the value and amount of money will increase and so will the purchasing power: the correct answer is "it will increase".
For example, if you invest 100 dollars, you will receive 108 dollars back, and you'd need 103 dollars to have the same value of money as before - but you have more.
Answer:
The answer is: Buyers will bid the asset's price down until it equals the present value of income.
Explanation:
As the current asset price is greater than the present value of income, it is overpriced.
So, seller is much willing to sell at this price, however, buyers does not want to buy asset at this price as they only want to purchase it at the price equals to the present value of its income.
So, Buyers will bid the asset's price down until it equals the present value of income which is the level they are willing to buy and also at which the seller is willing to sell also.
Answer:
Ranking 10% interest rate:
1) 5 years
2) 10 years
3) 1 year
Raking 2% interest rate:
1) 10 years
2) 5 years
3) 1 year
Raking 18% interest rate:
1) 1 year
2) 5 years
3) 10 years
Explanation:
You have to apply to bring the amount of money to present value, according with the information, the formula is the next:
Present Value = Future Value/((1+ interest rate)^(n))
Where n is the number of years that you have to wait to receive the money.
You have to calculate every situation with the respective amount of time and interest rate, the result must be money. and when you get the 9 results, you have to compare every situation and chose the higher amount of money according to the interest rate, for example:
Present value = 140/ ((1+10%)^(1))= 127
= 140/ ((1+10%)^(5))= 149
= 140/ ((1+10%)^(5))= 135
So the answer for the first scenario with an interest rate of 10% is:
Ranking 10% interest rate:
1) 5 years
2) 10 years
3) 1 year
Answer:
Viatical settlements may sound great on the surface but they present a lot of unique risks. Follow-on Investment Risk – some life policies are fully paid for, but many require you to continue to pay premiums for many years (or all the way up to the death of the insured).
Explanation:
Answer:
The value of the put option is;
e. $9.00
Explanation:
To determine the value of the put option can be expressed as;
C(t)-P(t)=S(t)-K.e^(-rt)
where;
C(t)=value of the call at time t
P(t)=value of the put at time t
S(t)=current price of the stock
K=strike price
r=annual risk free rate
t=duration of call option
In our case;
C(t)=$7.2
P(t)=unknown
S(t)=$50
K=$55
r=6%=6/100=0.06
t=1 year
replacing;
7.2-P=50-55×e^(-0.06×1)
7.2-P=50-(55×0.942)
7.2-P=50-51.797
P=51.797+7.2-50
P=$8.997 rounded off to 2 decimal places=$9.00
