i=j/m
First find the present value of $3800,then compare present values:
M = p(1+i/4)^4n
F=P(1+i)^n
FV=P(1+r/n)^nt
[15000 *(1+r/100)^2-15000]-(15000*r*2)/100=96
r=8
Sum =Rs.(50 x 100/2x5)
= Rs. 500.
Amount
=[Rs.500x(1+5/100)²]
=Rs(500x21/20x21/20).
=Rs. 551.25
C.I
= Rs. (551.25 - 500)
= Rs. 51.25
The single equivalent payment will be PV + FV.
FV = Future value of $10,000, 12 months later
$10,000 *(1.0075)/12
$10,938.07
PV= Present value of $10,000, 24 months earlier
$10,000/(1.0075)24
$8358.31
The equivalent single payment is
$10,938.07 + $8358.31 = $19,296.38
FV = $1000(1.04)(1.045)(1.05)(1.055)(1.06) = $1276.14
the maturity value of the regular GIC is
FV = $ 1000 x = $1276.28
i=j/m
FV = PV(1+ i)^n
FV1 = Future value of $2000, 1 year later
= PV (1+ i)^n
Let the sum be Rs.x. Then,
=> x =5500
sum = Rs. 5500.
So, S.I = Rs. = 1100
Comments
There are no comments.Copyright ©CuriousTab. All rights reserved.