What is the common ratio of the series $50+40+38...$ ?

Question

What is the common ratio of the series $50+40+38...$ ?

I know how to find the sum of $S_(oo)$ when $r$ is obvious, like with $sum_(n=1)^(oo)(1/2^n)$ , but I don't know how to find the sum when I don't know the common ratio.

2 Answers

Impact of this question

1287 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2017-08-21T18:18:57

The given series is not a Geom. Series, and, as such, we

can not have the Common Ratio.

Explanation:

The Common Ratio, associated with the following

Geometric Series, is $r :$

$a+ar+ar^2+ar^3+...+ar^(n-1)+...," where, "n in NN.$

Its General $n^(th)$ Term, $t_n$ is, $t_n=ar^(n-1), n in NN.$

We note that, $t_2/t_1=t_3/t_2=...=t_n/t_(n-1)=r.$

As far as the given series is concerned, we find that,

$t_2/t_1=40/50=4/5," whereas, "t_3/t_2=38/40=19/20.$

So, the given series is not a Geom. Series, and, as such, we

can not have the Common Ratio.

Answer 2 · 2017-08-22T01:12:50

The terms fit a quadratic sequence of the form:

$u_n =4n^2-22n+68$

Explanation:

We are only given 3 terms which limits the accuracy of any conclusion drawn. Let us assume that it is a quadratic sequence. Without additional terms we can be certain this is the correct assumption.

Take the difference between consecutive terms, and then take the difference between those terms, as follows:

${: ("Seq: ",50,,40,,38), ("1st Difference:",,-10,,-2,),("2nd difference:",,,8,,) :}$

So, if this is a quadratic sequence, the terms form a quadratic sequence, of the form:

${u_n} = an^2 + bx + c$

and the quadratic coefficient is twice the 2nd difference, ie:

$2a=8 => a=4$

We now form a table where we take the original sequence and subtract the quadratic term to give a residue:

${: (n:, 1,2,3), (n^2:, 1,4,9), ("Seq ("n"): ", 50,40,38), (an^2: ,4,16,36), ("Residue:" ,46,24,2) :}$

So we can now also conclude that the linear part of the sequence ( $bx+c$ ) form the terms ${46,24,2 }$ , so we can conclude that $b=-22$ and $c=68$ and hence the general term of the sequence is:

$\ \ \ \ \ u_n = an^2+bn+c$
$:. u_n =4n^2-22n+68$

Which we can verify as follows:

${: (n:, 1,2,3), (n^2: ,1,4,9), (ul(" ") ,ul(" "),ul(" "),ul(" ")),(4n^2 ,4,16,36),(-22n ,-22,-44,-66),(+68 ,68,68,68),(ul(" ") ,ul(" "),ul(" "),ul(" ")),(u_n ,50,40,38) :}$

Science

Math

Humanities

... and beyond

What is the common ratio of the series $50+40+38...$ ?

I know how to find the sum of $S_(oo)$ when $r$ is obvious, like with $sum_(n=1)^(oo)(1/2^n)$ , but I don't know how to find the sum when I don't know the common ratio.

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

What is the common ratio of the series 50+40+38...50+40+38...?

I know how to find the sum of S_(oo)S_(oo) when rr is obvious, like with sum_(n=1)^(oo)(1/2^n)sum_(n=1)^(oo)(1/2^n), but I don't know how to find the sum when I don't know the common ratio.

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question

What is the common ratio of the series $50+40+38...$ ?

I know how to find the sum of $S_(oo)$ when $r$ is obvious, like with $sum_(n=1)^(oo)(1/2^n)$ , but I don't know how to find the sum when I don't know the common ratio.