Summation Theorems

evene · 2016-11-18 15:13:31

Given the general form of a series in Geometric Progression

With a=first term, r=common ratio, s=sum of n terms, then

If r be less than 1 and n be infinite.

a,b,c,d, &c are in Harmonic Progression when the reciprocals 1/a,1/b,1/c,1/d,&c are in Arithematic Progression or when a:b::a-b:b-c between any three consecutive terms.

The nth term of the serie is

How would you prove the formulas?

thickhead · 2016-11-18 17:32:32

The nth term of the serie should be

I think the proof is too elementary and no help should be sought from the forum.

zetafunc · 2016-11-18 22:01:18

evene wrote:

Given the general form of a series in Geometric Progression
With a=first term, r=common ratio, s=sum of n terms, then

If r be less than 1 and n be infinite.

More precisely, |r| < 1.

Try calling the sum of the first series S and then multiplying it by r. Then re-arrange to get a formula for S. What happens as n gets large, and why is the assumption |r| < 1 necessary?

Last edited by zetafunc (2016-11-18 22:02:08)

evene · 2016-11-19 05:25:08

No thickhead, the book wrote it as

thickhead · 2016-11-19 05:39:38

O.K. I may be wrong.

thickhead · 2016-11-19 14:53:51

hi evene,
Can you check the nth term by substituting n=1,2,3 etc.?

Math Is Fun Forum

#1 2016-11-18 15:13:31

Summation Theorems

#2 2016-11-18 17:32:32

Re: Summation Theorems

#3 2016-11-18 22:01:18

Re: Summation Theorems

#4 2016-11-19 05:25:08

Re: Summation Theorems

#5 2016-11-19 05:39:38

Re: Summation Theorems

#6 2016-11-19 14:53:51

Re: Summation Theorems

Board footer