Answer:
e. 14.20%
Explanation:
We use the formula:
A=P(1+r/100)^n
where
A=future value
P=present value
r=rate of interest
n=time period.
Hence
A=$450(1.1)^2+$450(1.1)^1+$450
=$450[(1.1)^2+(1.1)+1]
=$1489.50
Hence
MIRR=[Future value of inflows/Present value of outflows]^(1/time period)-1
=[1489.5/1000]^(1/3)-1
=14.20%(Approx)
Answer:
7.31%
Explanation:
The question is pointing at the bond's yield to maturity.
The yield to maturity can be computed using the rate formula in excel as provided below:
=rate(nper,pmt,-pv,fv)
nper is the number of times the bond would pay annual coupons which is 31
pmt is the annual coupon payment i.e $1000*8.0%=$80.00
pv is the current price of the bond which is $1,084
fv is the face value of the bond which is $1,000
=rate(31,80,-1084,1000)=7.31%
The yield to maturity is 7.31%
That is the annual rate of return for an investor that holds the bond till maturity.
Answer:
97 days
Explanation:
In simple interest method, the interest is calculated by the following formula
I= P x R x T
I= interest
P = principal amount
R =interest rate
T= Time
In this case
I=$16
P=$1500$
R= 4% or 0.04%
T= time
$16= $1500 x 0.04 x Time
$16 =60 x Time
Time = 16/60
time = 0.2666 year.
time in days = 0.26666 x 365 days
=97.333 days
=97 days
It's called dividend. It's their share of the profit