EasyManua.ls Logo

Casio fx-9860G Series - Compound Interest; Formula I; Formula II

Casio fx-9860G Series
603 pages
Save Page as PDF
Print Icon
To Next Page IconTo Next Page
To Next Page IconTo Next Page
To Previous Page IconTo Previous Page
To Previous Page IconTo Previous Page
Loading...
20070201
7-3-1
Compound Interest
PV : present value
FV : future value
PMT : payment
n : number of compound periods
I% : annual interest rate
i is calculated using Newton’s Method.
S = 0 assumed for end of term
S = 1 assumed for beginning of term
F(i) = Formula I
u Formula II ( I % = 0)
Here:
i(1 + i)
n
(1 + i × S)[(1 + i)
n
–1]
=
α
i(1 + i)
n
(1 + i × S)[(1 + i)
n
–1]
=
α
(1+ i)
n
1
=
β
(1+ i)
n
1
=
β
+ (1 + i × S)[n(1 + i)
n–1
]+
S
nFV(1 + i)
n–1
ii
PMT
(1 + i × S)[1 – (1 + i)
n
]
F(i)' =–
[
+S [1 – (1 + i)
n
]
]
+ (1 + i × S)[n(1 + i)
n–1
]+
S
nFV(1 + i)
n–1
ii
PMT
(1 + i × S)[1 – (1 + i)
n
]
F(i)' =–
[
+S [1 – (1 + i)
n
]
]
PV + PMT × n + FV = 0PV + PMT × n + FV = 0
PV =– (PMT × n + FV )PV =– (PMT × n + FV )
7-3 Compound Interest
This calculator uses the following standard formulas to calculate compound interest.
u Formula I
Here:
PV + PMT × + FV
i(1 + i)
n
(1 + i)
n
(1 + i × S)[(1+ i)
n
–1] 1
= 0
i =
100
I %
PV + PMT × + FV
i(1 + i)
n
(1 + i)
n
(1 + i × S)[(1+ i)
n
–1] 1
= 0
i =
100
I %
PV =–(PMT × + FV × )
β
α
PV =–(PMT × + FV × )
β
α
FV =–
β
PMT × + PV
α
FV =–
β
PMT × + PV
α
PMT =–
β
PV + FV ×
α
PMT =–
β
PV + FV ×
α
n =
log
{ }
log(1 + i)
(1+ i × S ) PMT + PVi
(1+ i × S ) PMT FVi
n =
log
{ }
log(1 + i)
(1+ i × S ) PMT + PVi
(1+ i × S ) PMT FVi

Table of Contents

Related product manuals