Answer:
8.30%
Explanation:
The weighted average cost of capital of the company is computed using the WACC formula below:
WACC=(We*Ke)+(Wp*Kp)+(Wd*kd)
We=weight of common equity=50%
Ke=cost of retained earnings which is a proxy for the cost of equity=11.50%
Wp=weight of preferred stock=20%
Kp=cost of preferred stock=6.00%
Wd=weight of debt=30%
Kd=after-tax cost of debt=4.50%
WACC=(50%*11.50%)+(20%*6.00%)+(30%*4.50%)
WACC=8.30%
Answer:
$2,198,000
Explanation:
The computation of the value of the capital in excess of par account after the dividend is shown below:
Number of shares of stock outstanding = 42,000 shares
Stock dividend percentage = 50%
Now the new shares would be
= 42,000 × 50%
= 21,000 shares
Capital in excess of par value would be
= $41 - $1
= $40
For 21,000 shares, the paid in capital in excess is
= 21,000 shares × $40
= $840,000
And, the capital in excess as per the balance sheet is $1,358,000
Now the value of the capital in excess of par after the dividend is
= $1,358,000 + $840,000
= $2,198,000
Answer: $449.53
When Shawna wrote a check for $23.77, the same amount was deducted from her bank account, decreasing her balance to $99.55. When she deposited two checks totaling $349.98, the amount was added, making her new balance increased to $449.53.
Answer:
Young should report proceeds from the sale of bonds as equal to $864,884
Explanation:
The proceeds on the sale of bonds is equivalent to the present value of all the cash flows that are likely to accrue to an investor once the bond is bought. These cash-flows are the periodic coupon payments that are paid semi-annually and the par value of the bond that will be paid at the end of the 5 years.
During the 5 years, there are 10 equal periodic coupon payments that will be made. In each year, the total coupon paid will be
and this payment will be split into two equal payments equal to 
. This stream of cash-flows is an ordinary annuity
The periodic market rate is equal to 
The PV of the cashflows = PV of the coupon payments + PV of the par value of the bond
=$40,000*PV Annuity Factor for 10 periods at 4%+ 
