Answer:
The price of the bond is $659.64.
Explanation:
C = coupon payment = $62.00 (Par Value * Coupon Rate)
n = number of years = 6
i = market rate, or required yield = 15 = 0.15 = 0.15 /2 = 0.075
k = number of coupon payments in 1 year = 2
P = value at maturity, or par value = $1000
BOND PRICE= C/k [ 1 - ( 1 / ( 1 + i )^nk ) / i ] + [ P / ( 1 + i )^nk )]
BOND PRICE= 62/2 [ 1 - ( 1 / ( 1 + 0.075 )^6x2 ) / 0.075 ] + [ $1,000 / ( 1 + 0.075 )^6x2 )]
BOND PRICE= 31 [ 1 - ( 1 / ( 1.075 )^12 ) / 0.075 ] + [ $1,000 / ( 1.075 )^12 )]
BOND PRICE= 31 [ 1 - ( 1 / ( 1.075 )^12 ) / 0.075 ] + [ $1,000 / ( 1.075 )^12 )]
BOND PRICE= $239.79 + $419.85 = $659.64
Answer:
$1,069.74
Explanation:
We use the present value formula which is shown in the attachment below:
Data provided in the question
Future value = $1,000
Rate of interest = 12%
NPER = 16 years
PMT = $1,000 × 13% = $130
The formula is shown below:
= -PV(Rate;NPER;PMT;FV;type)
So, after solving this, the value of the bond is $1,069.74
U forgot to add the picture
Answer:
cash 967,707 debit
premium on BP 67,707 credit
Bnds Payable 900,000 credit
interest expense 58062.42 debit
premium on BP 437.58 debit
cash 58500 credit
Explanation:
procceds 967,707
face value 900,000
premium on bonds payable 67,707
<em><u>first interest payment</u></em>
carrying value x market rate
967,707 x 0.06 = 58062.42
then cash outlay
face valeu x bond rate
900,000 x 0.065 = 58,500
the difference will be the amortization