Answer:
B. 105 days of accrued interest
Explanation:
The purchase on Thursday, October 12th will settle on Monday, October 16th - 2 business days after trade date.
Accrued interest on corporate bonds is based on a 30days per month/360 day year.
And interest starts accruing from the day of the last interest payment, up to, but not including, settlement.
See below for day calculation
July 30 days
August 30 days
September 30 days
October 15 days (up to but excluding settlement)
Total 105 days
Answer:
6.35%
Explanation:
If you purchase this bond you will need to pay $1,000 x 136.04% = $1,360.40
the coupon rate is 9.5% / 2 = 4.75% or $47.50 every six months
the bond matures in 18 years or 36 semiannual periods
yield to maturity = {coupon + [(face value - market value)/n]} / [(face value + market value)/2]
YTM = {47.5 + [(1,000 - 1,360.4)/36]} / [(1,000 + 1,360.4)/2]
YTM = 37.49 / 1,180.2 = 0.031766 x 2 (annual yield) = 0.06353 = 6.35%
The answer to the first one is False. The described process is called Garnishments. A periodic rate is <span>the interest rate you are charged for one payment period. </span>Fees associated with buying and finalizing your loan are known as closing costs
Answer:
No it wont have enough money to build a warehouse in two years.
Explanation:
Firstly we are given that the warehouse is $1 million so the company needs to save this amount of money in two years time.
We know that the company has invested $500000 to date therefore we need to calculate if this $50000 per quarter investment will cover the the other portion for $500000 to meet the warehouse cost of $1 million so we will use the future value annuity formula to calculate this which is :
Fv = C[((1+i)^n -1)/i]
where Fv will be the future value after two years of the $50000 investment
C is the periodic payment of $50000
i is the interest rate per period which is 6% per quarter
n is the number of periods the payment is done here it is 4 x 2years= 8 periods / investments of $50000 that will be done.
thereafter we substitute on the above formula:
Fv = 50000[((1+6%)^8 - 1)/6%]
Fv = $494873.40
then we combine this amount to $500000 to see if it reaches $1 million
$494873.40+ $500000 = $994873.40 which is close to the warehouse cost of $1 million but it does not reach it so the company wont have enough money to purchase the warehouse.
