Answer:
c. debit Investment-Evans Company Bonds, $100,000, and Interest Receivable $1,500; credit Cash $101,500
Explanation:
c. debit Investment-Evans Company Bonds, $100,000, and Interest Receivable $1,500; credit Cash $101,500
The interest is due on bonds of $ 100,00 so it is added to the total amount.
The other choices are incorrect as A does not account for interest due.
B does not indicate the amount of interest separately. D is wrong as interest is again deducted from the total of bonds also they are credited it is receivable not payable
Answer:
$96,000
Explanation:
Production 26,000 units
<u>Materials Purchase Budget</u>
Production Materials Required (5×26,000 units) 130,000
Add Budgeted Closing Materials (50,000×20%×5) 50,000
Total Materials 180,000
Less Budgeted Opening Inventory (4,000×5) (20,000)
Budgeted Materials 160,000
Material Cost per pound $0.60
Total Material Cost $96,000
Therefore, the materials purchases budget will be for the month ending April 30 will be $96,000.
Answer: $3.46
Explanation:
Given the following :
Current share price (P0) = $90 per share
Required return on stock= 8%
total return on the stock is evenly divided between a capital gains yield and a dividend yield ;
Therefore, Required return on stock= 8% ;
4% capital gain yield + 4% Dividend yield = 8%
Growth rate = 4% = 4/ 100 = 0.04
D1 = D0(1 + g)
D1 = value of next year's Dividend
D0 = current Dividend yield
g = Constant growth rate
D1 = current stock price * g
D1 = 90 * 0.04 = 3.6
D1 = D0(1 + g)
D0 = D1 / (1+g)
D0 = 3.6 / (1+ 0.04)
D0 = 3.6 / 1.04
D0 = $3.46
Answer:
option (C) - 6.11%
Explanation:
Data provided :
Coupon rate one year ago = 6.5% = 0.065
Semiannual coupon rate =
= 0.0325
Face value = $1,000
Present market yield = 7.2% = 0.072
Semiannual Present market yield, r =
= 0.036
Now,
With semiannual coupon rate bond price one year ago, C
= 0.0325 × $1,000
= $32.5
Total period in 15 years = 15 year - 1 year = 14 year
or
n = 14 × 2 = 28 semiannual periods
Therefore,
The present value = ![C\times[\frac{(1-(1+r)^{-n})}{r}]+FV(1+r)^{-n}](https://tex.z-dn.net/?f=C%5Ctimes%5B%5Cfrac%7B%281-%281%2Br%29%5E%7B-n%7D%29%7D%7Br%7D%5D%2BFV%281%2Br%29%5E%7B-n%7D)
= ![\$32.5\times[\frac{(1-(1+0.036)^{-28})}{0.036}]+\$1,000\times(1+0.036)^{-28}](https://tex.z-dn.net/?f=%5C%2432.5%5Ctimes%5B%5Cfrac%7B%281-%281%2B0.036%29%5E%7B-28%7D%29%7D%7B0.036%7D%5D%2B%5C%241%2C000%5Ctimes%281%2B0.036%29%5E%7B-28%7D)
or
= $32.5 × 17.4591 + $1,000 × 0.37147
= $567.42 + $371.47
= $938.89
Hence,
The percent change in bond price = 
= 
= - 6.11%
therefore,
the correct answer is option (C) - 6.11%