Answer:
Incurred but unpaid
Explanation:
When wages and salaries are incurred by an entity and paid, the entries required are debit Wages and Salaries expense, credit cash account. However, when the expense is incurred but cash is yet to be paid, this represents a liability to the organization and as such, an accrual is required. The entries to be posted are debit Wages and salaries expense (in the income statement), credit Accrued wages and salaries (in the balance sheet).
Answer:
The maximum profit and loss for this position is $3 and -$7 respectively
Explanation:
The computations are shown below:
For maximum profit:
= Strike price at the sale - stock price + put price - call price
= $42 - $39 + $0.55 - $0.55
= $3
For maximum loss:
= Strike price at purchase - stock price + put price - call price
= $32 - $39 + $0.55 - $0.55
= -$7
Simply we take the difference between the strike price ,and the stock price and after that the put and call price are adjusted
Answer:
The working capital for 2017 is $15,500
Explanation:
Working capital: It shows a difference between the currents and the current liabilities
In mathematically,
Working Capital = Current Assets - current liabilities
where,
Total current assets = Cash + short-term investments + net accounts receivable + merchandise inventory
= $46,500 + $24,000 + $57,000 + $158,000
= $285,500
And, the current liabilities = Accounts Payable + Salaries Payable
= $133,500 + $17,000
= $150,500
Now put these values to the above formula
So, the value would equal to
= $285,500 - $150,500
= $15,500
Answer:
Since Interest Rate and Period is not given; we would assume the spring term begins in 4 months and
Explanation:
First we will require to use the compound interest formula.
It is not mentioned the compounding period in the question. However, many of the bank accounts today offer monthly compounding, and this will be used as the basis.
i=interest rate=7.62% p.a => 7.62/12=0.635% per month
FV=PV(1+i)^n
FV=future value = 2200
PV=present value, to be found
i=interest rate per compounding period (month)=0.00635
n=number of periods=4
2200=PV(1+0.00635)^4
PV=2200/(1.00635^4)
PV=$2144.99
In case interest is not compounded, we could apply the simple interest formula:
FV=PV(1+ni)
PV=2200/(1+4*0.00635)
PV=$2145.504
Answer:
Instructions are below.
Explanation:
Giving the following information:
Martha receives $200 on the first of each month. Stewart receives $200 on the last day of each month. Both Martha and Stewart will receive payments for 30 years. The discount rate is 9 percent, compounded monthly.
To calculate the present value, first, we need to determine the final value.
i= 0.09/12= 0.0075
n= 30*12= 360
<u>Martha:</u>
FV= {A*[(1+i)^n-1]}/i + {[A*(1+i)^n]-A}
A= montlhy payment
FV= {200*[(1.0075^360)-1]}/0.0075 + {[200*(1.0075^360)]-200}
FV= 366,148.70 + 2,746.12
FV= 368,894.82
Now, the present value:
PV= FV/ (1+i)^n
PV= 368,894.82/ 1.0075^360
PV= $25,042.80
<u>Stewart:</u>
FV= {A*[(1+i)^n-1]}/i
A= monthly payment
FV= {200*[(1.0075^360)-1]}/0.0075
FV= 366,148.70
PV= 366,148.70/1.0075^360
PV= $24,856.37
Martha has a higher present value because the interest gest compounded for one more time.