Solve for i in terms of other variables: F=C[frac((1+i)^n-1)(i)]

OlmekinjP

OlmekinjP

Answered question

2021-09-15

Solve for i in terms of other variables:
F=C[(1+i)n1i]

Answer & Explanation

Alix Ortiz

Alix Ortiz

Skilled2021-09-16Added 109 answers

Step 1
since, we know Binomial Expansion for (1+xn) is Replace
(1+x)n=1+nx+n(n1)2!x2+n(n1)(n2)3!x3+s˙+xn
Replace n by (n-1), we get
(1+x)n1=1+(n1)x+(n1)(n2)2!x2+(n1)(n2)(n3)3!x3+s˙+xn1
Step 2
Now, given that
F=C[(1+i)n1i]
Since, we know
(1+i)n=1+ni+n(n1)2!i2+s˙+in
then
(1+i)n1=1+ni+n(n1)2!i2+s˙+in1
Now, we can cancel "1" in right side of equation, we get
(1+i)n1=ni+n(n1)2!i2+s˙
(1+i)n1=i(ni+n(n1)2!i2+s˙) then
(1+i)n1i=i(ni+n(n1)2!i2+s˙)i=(n+n(n1)2!i+n(n1)(n2)3!i2+s˙)
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