Answer: The standard deviation of the stock is 3.23 percentage
Explanation:
First we shall calculate the epected weighted average return of the stock.
We shall multiply the probability of the scenario with its expected return and then take the sum of the expected returns of different scenarios,
E(x) = (0.2 x 14%) + (0.7 x 8%) + (0.1 x 2%)
E(x) = 8.6%
We shall use the follwing formula to calculate the Variance of the stock,
σ²(x) = ∑ P() × [ - E(r)]²
σ²(x) = (0.2) (0.14 - 0.086)² + (0.7) (0.08 - 0.086)² + (0.1) (0.02 - 0.086)²
σ²(x) = 0.001044
To find the standar deviation,
σ(x) =
σ(x) = 0.0323109
in percentage it would be 3.23%
Answer:
The correct answer is option C.
Explanation:
When the interest rate falls below the normal level, people expect the interest rates to rise in future and bond prices to fall. This causes investors to sell the bonds at present so that they can buy bonds when they are selling at lower prices in future as of result of an increase in interest rates. Money demand will, as a result, will decrease.
Answer:
Accounting treatment (debit credit rules) of given entries
Explanation:
- Purchased office furniture on account Account
Furniture ie Asset increase - Debit , Creditor (Furniture Supplier) ie Liability increase - Credit
- Provided services on account
Debtor ie Asset increase - Debit , Sale ie Income increase - Credit
Prepaid Expense (Rent) ie Asset Increase - Debit. Rent paid now implies later rent ie (Expense) decrease - Credit
Answer:
$4,265.55
Explanation:
Future value = $120,000
Interest rate (i) = 5%
Annual deposit = ?
Time period (n) = 18 year
Since deposit are to be made at the beginning of each year, hence the relevant factor table to be used is future value annuity due factor table.
Future value = Annual deposit x future value annuity due factor (i%, n)
120,000 = Annual deposit x FVADF (5%, 18period)
120,000 = Annual deposit x 28.13238
Annual deposit = 120,000/28.13238
=$4,265.547
=$4,265.55
Answer:
The initial deposit should be $ 25.46
Explanation:
The Annuity formula is
P=R [1−(1+i)^-n/i]⋅(1+i)
Where
P= Initial deposit
R=Regular Withdraw amount
i=Interest rate
n=Number of years/periods
After entering corresponding values in the formula we get $25.46
so P (which is our initial deposit)=25.46