Question

How do I differentiate `50sum_(i=1)^x(1.03^i)`?

Answer 1

`d/dx 50 \ sum_(i=1)^x \ (1.03)^i = (5150 \ ln 1.03)/3 \ 1.03^x`

`" " ~~ 50.742610... \ 1.03^x`

Explanation:

First let us consider the sum:

`S = sum_(i=1)^n \ (1.03)^i`

For clarity, let us expand the summation:

`S = 1.03 + 1.03^2 + 1.03^3 + ... + 1.03^n`

It should be clear that this summation is that of a GP (Geometric Progression) with first term `a=1.03` and common ratio `r=1.03`/ As such we can use the GP summation formula:

`S_n = (a(r^n-1))/(r-1)`

`\ \ \ \ = (1.03(1.03^n-1))/(1.03-1)`

`\ \ \ \ = (1.03)/(0.03)(1.03^n-1)`

`\ \ \ \ = (103)/(3)(1.03^n-1)`

Using this summation result we can now write the problem as:

`d/dx 50 \ sum_(i=1)^x \ (1.03)^i = d/dx { (50 xx 103)/(3)(1.03^x-1) }`

`" " = 5150/3 \ d/dx { 1.03^x-1 }`

`" " = 5150/3 \ d/dx { 1.03^x }`

`" " = 5150/3 \ d/dx { e^(ln 1.03^x) }`

`" " = 5150/3 (ln 1.03) e^(ln 1.03^x)`

`" " = (5150 \ ln 1.03)/3 \ 1.03^x`

`" " ~~ 50.742610... \ 1.03^x`