Answer:
$ 480 000
Explanation:
Assets : $700 000(@ beginning of year )
$100 000 increase (during year )
700 000+100 000=$800 000(@end of year)
Liabilities : $400 000(@ begininng of year )
$80 000 decrease (@ during of year)
400 000-80 000=$320 000 (@end of year)
Asset = Equity + Liability
Amount of owner’s equity at the end of the year (let x = owners equity)
800 000= x + 320 000
x= 800 000 - 320 000=$480 000
Answer:
$22,897.74
Explanation:
Given:
Loan amount (P) = $22,000
rate (R) = 8% = 8/100=0.08/365 = 0.000219178082
Number of days(n) = 6 month = (6 x 365)/12 = 182.5
Total Amount = ?

Therefore, he have to pay $22,897.74 to the bank.
true because the corporation has more money to spend
Answer:
a) $2000
b) $1,886.7925
C) $2,036.7925
Explanation:
First, the question states to determine the expected claim cost per policy
Expected Claim Cost represents the fund required to be paid by an insurer for a particular contract or a group of contracts as the case maybe. This is usually based on the policy taken.
A) Expected Claim Cost per policy
= (Policy Loss Value A x its probability) + (Policy Loss Value B x its probability) + (Policy Loss Value C x its probability)+(Policy Loss Value D x its probability)+ (Policy Loss Value E x its probability)
= ( (100000 x 0.005 )+ (60000 x 0.010) + (20000 x 0.02) + (10000 x 0.05) + 0 = $2000
Part B: discounted expected claim cost per policy
Since, the sum of $2000 is expected to be paid by the insurer by the end of the year, the interest to be earned based on the rate (discounting used)
=$2,000 ÷ (1 + 0.06)
= $1,886.7925
Part C:: Determine the Fair Premium
Fair Premium is calculated as follows
The discounted policy claim cost + the Processing Cost per application + The fair profit loading
= $1,886.7925+ $100+50 = $2,036.7925
Answer:
After 14 years, the compounded value of the invested amount = $733,200.27
Explanation:
What the question is asking us to find is the future value of an amount that is invested over a period of 14 years, compounded at 15% semiannually.
The formula is:

where ;
FV = Future value
PV = present value (principal)
i = nominal interest
n = compounding frequency in a year
t = total number of years.
Note: for investments that are compounded annually, n = 1, because compounding is once in a year, for those compounded semiannually, n=2, because compounding is twice in a year, for compounding done quarterly, n = 4 because there are four quarters in a year and so on.
Putting, the values into the equation above;


= $733,200 (to the nearest dollar)