Answer:
$250 ( C )
Explanation:
using the given data below is the entry
The adjusting entry to recognize bad debts will include a debit to bad debt expense for
<h3>
particulars amount</h3>
Beginning accounts receivable 14000
+ Credit sales made during the year 172000
(-) collections from debtors (170000)
(-) expected salary return & allowances for credit sales (2000)
Ending accounts receivable 14000
Percentage of bad debt 1.5%
Total bad debts balance required ( 14000*1.5%) 210
+ Already debit balance in allowance for doubtful account 40
Total debit to be made in bad debts 250
Total debts = total bad debts balance required + already debit balance in all
= 210 + 40 = $250
A cosmograph simply because that is not what any of the other graphs look like. D is the only one that can take the shape of a state.
5 weeks
There are 52 weeks per year and since the company closes for 2 weeks per year, that means that the company does business for 50 weeks each year. During that year, the company sold goods that cost $76,500. And the average inventory was $7,650 which is $7,650 / $76,500 = 0.10 = 10% of the goods sold for the entire year. So the average inventory could allow the company to work for 10% of the year. And 10% of 50 is 5. Therefore the company had 5 weeks of supply on average in inventory.
Answer:
$76,134.84
Explanation:
Data provided in the given question
Future value = $105,000
Fixed interest rate = 4.1%
Number of years = 8
The calculation of present value is given below:-
= Future value ÷ (1 + rate of return)^number of years
= $105,000 ÷ (1 + 4.1%)^8
= $105,000 ÷ 1.379132002
= $76,134.84
Therefore, we simply applied the present value formula.
Answer:
Bond Price= 106.77
Explanation:
Giving the following information:
Face value= 100
Coupon= 100*0.05= 5
Yield To Maturity= 0.035
Years to maturity= 5 years
<u>To calculate the price of the bond, we need to use the following formula:</u>
Bond Price= cupon*{[1 - (1+i)^-n] / i} + [face value/(1+i)^n]
Bond Price= 5*{[1 - (1.035^-5)] / 0.035} + [100/(1.035^5)]
Bond Price= 22.57 + 84.2
Bond Price= 106.77