What is Sums: Definition and 370 Discussions

In mathematics, summation is the addition of a sequence of any kind of numbers, called addends or summands; the result is their sum or total. Beside numbers, other types of values can be summed as well: functions, vectors, matrices, polynomials and, in general, elements of any type of mathematical objects on which an operation denoted "+" is defined.
Summations of infinite sequences are called series. They involve the concept of limit, and are not considered in this article.
The summation of an explicit sequence is denoted as a succession of additions. For example, summation of [1, 2, 4, 2] is denoted 1 + 2 + 4 + 2, and results in 9, that is, 1 + 2 + 4 + 2 = 9. Because addition is associative and commutative, there is no need of parentheses, and the result is the same irrespective of the order of the summands. Summation of a sequence of only one element results in this element itself. Summation of an empty sequence (a sequence with no elements), by convention, results in 0.
Very often, the elements of a sequence are defined, through regular pattern, as a function of their place in the sequence. For simple patterns, summation of long sequences may be represented with most summands replaced by ellipses. For example, summation of the first 100 natural numbers may be written as 1 + 2 + 3 + 4 + ⋯ + 99 + 100. Otherwise, summation is denoted by using Σ notation, where






{\textstyle \sum }
is an enlarged capital Greek letter sigma. For example, the sum of the first n natural integers can be denoted as






i
=
1


n


i
.


{\textstyle \sum _{i=1}^{n}i.}

For long summations, and summations of variable length (defined with ellipses or Σ notation), it is a common problem to find closed-form expressions for the result. For example,







i
=
1


n


i
=



n
(
n
+
1
)

2


.


{\displaystyle \sum _{i=1}^{n}i={\frac {n(n+1)}{2}}.}
Although such formulas do not always exist, many summation formulas have been discovered—with some of the most common and elementary ones being listed in the remainder of this article.

View More On Wikipedia.org
Recent contents Top users
  1. P

    Lower and Upper Riemann sums of sin(x)

    Task in real analysis: P is a uniform partition on [0, π] and is divided into 6 equal subintervals. Show that the lower and upper riemann sums of sin (x) over P is lesser than 1.5 and larger than 2.4 respectively. My attempt at the solution: The greates value and the least value of sin x over...
  2. M

    Mathematica Expressing Functions as Sums in Mathematica: Sigma Notation Guide

    Does anyone know how to express a given function as a sum in mathematica using sigma notation? For example, I know how to make ##e^x = 1 + x^2/2 + x^3/6 + x^4/24...## but how would I have mathematica write it as ##e^x = \Sigma_{n=0}^{\infty} x^n/n!##? Thanks a ton!
  3. Math Amateur

    MHB Direct Sums of Copies of Modules - B&K - Exercise 2.1.6 (iii)

    I am reading An Introduction to Rings and Modules With K-Theory in View by A.J. Berrick and M.E. Keating (B&K). In Chapter2: Direct Sums and Short Exact Sequences we find Exercise 2.1.6 part (iii). I need some help to get started on this exercise. Exercise 2.1.6 reads as follows: I am...
  4. Math Amateur

    MHB Ordered Index Sets for Direct Sums & Products of Modules: Explained by B&K

    I am reading An Introduction to Rings and Modules With K-Theory in View by A.J. Berrick and M.E. Keating (B&K). In Chapter2: Direct Sums and Short Exact Sequences in Sections 2.1.14 and 2.1.15 B&K deal with ordered index sets in the context of direct sums and products of modules. Although it...
  5. Math Amateur

    MHB Direct Products and External Direct Sums

    I am reading An Introduction to Rings and Modules With K-Theory in View by A.J. Berrick and M.E. Keating (B&K). I an trying to gain a full understanding of direct products and external direct sums of modules and need some help in this matter ... ... B&K define the external sum of an arbitrary...
  6. Math Amateur

    MHB Infinite Direct Sums and Standard Inclusions and Projections

    I am reading An Introduction to Rings and Modules With K-Theory in View by A.J. Berrick and M.E. Keating (B&K). In Chapter2: Direct Sums and Short Exact Sequences in Sections 2.1.11 and 2.1.12 B&K deal with infinite direct products and infinite direct sums (external and internal). In Section...
  7. N

    Confusion with integration of sums

    Hello guys, since I am new at sums and multivariable calculus I faced a problem when I stumbled upon this: \sum_{r=0}^{k} \binom{n}{4r+1} x^{n-4r-1} y^{4r+1} = \sum_{r=0}^{b} \binom{n}{4r+3} x^{n-4r-3} y^{4r+3} Well, the problem is that I don't know if it's possible to put a limit in every...
  8. D

    Squared operators and sums of operators in practice

    Consider a one dimensional harmonic oscillator. We have: $$\hat{n} = \hat{a}^{\dagger} \hat{a} = \frac{m \omega}{2 \hbar} \hat{x}^2 + \frac{1}{2 \hbar m \omega} \hat{p}^2 - \frac{1}{2}$$ And: $$\hat{H} = \hbar \omega (\hat{n} + \frac{1}{2})$$ Let's say we want to measure the total...
  9. Math Amateur

    MHB Endomorphisms of Direct Sums - Berrick and Keating - Exercise 2.1.6 (i)

    Exercise 2.1.6 (i) of Berrick and Keating's book An Introduction to Rings and Modules reads as follows:Let M = M_1 \oplus M_2, an internal sum of right R-modules, and let \{ \sigma_1 , \sigma_2, \pi_1 , \pi_2 \} be the corresponding set of inclusions and projections. Given an endomorphism \mu...
  10. P

    Why Does This Equation Include Sums of h(t-ti)? Explained.

    Can someone explain to me why in this equation (attached) where ρ(t)=\sumδ(t-ti) , dirac funtion. in the left side we have the sum over h(t-ti) instead of the sum over h(ti) ? It seems to me that the integral would work summing 1*h(t1)+1*h(t2)+...+1*h(ti) for all ti smaller than t.
  11. Math Amateur

    MHB Infinite Direct Sums and Indexed Sets

    I am reading Chapter 2: Vector Spaces over \mathbb{Q}, \mathbb{R} \text{ and } \mathbb{C} of Anthony W. Knapp's book, Basic Algebra. I need some help with some issues regarding infinite direct sums and products and indexed families of sets ... ... On page 62, Knapp introduces direct...
  12. Math Amateur

    MHB Isomorphism Between External and Internal Direct Sums - Knapp Proposition 2.30

    I am reading Chapter 2: Vector Spaces over \mathbb{Q}, \mathbb{R} \text{ and } \mathbb{C} of Anthony W. Knapp's book, Basic Algebra. I need some help with some issues regarding Theorem 2.30 (regarding an isomorphism between external and internal direct sums) on pages 59-60. Theorem 2.27 and...
  13. A

    MHB Basic Calculus II Integral Questions - Riemann Sums, Absolute Integrals, etc.

    Hey guys, I'd appreciate some help for this problem set I'm working on currently The u-substitution for the first one is somewhat tricky. I ended up getting 1/40(u)^5/2 - 2 (u) ^3/2 +C, which I'm not too sure about. I took u from radical 3+2x^4. For the second question, I split the integral...
  14. C

    Positive probabilities for neg sums of uniformly distributed variables

    I've been thinking about the Central Limit Theorem and by my understanding it states that the sum of randomly distributed variables follows approximately a normal distribution. My question is if you have, say, 100 uniformly distributed variables that range from 0 to 10, their sum has to be...
  15. A

    Determination of limit in Riemann sums.

    How could I find the lim as n-> infinity of the expression I attached? The only way I could find was to express it in terms of a definite integral. Integral of xe^(-2x) from 0 to 1. What is the other way?
  16. Albert1

    MHB Finding the Limit of Digit Sums in A

    digits sum $A\in ${1,2,3,4,----2013} a number p is picking randomly from A if $q_1$=the digits sum of p if $q_2$=the digits sum of $q_1$ ------ continue this procedure until the digits sum=1 then stop How many numbers we can pick from A ,and meet the requirement ?
  17. J

    Gauss's Trick - Arithmetic Sums

    I can't grasp the underlying process on how this is working. n/2(f+l) = algorithm sum of all integers n= number of all integers f= first integer l= last integer Example: 1, 2, 3, 4 4/2(1+4) 2(5) = 10 I know how to do it, but I don't really understand how to actually do it. Am I...
  18. B

    Is there a Leibnitz theorem for sums with variable limits?

    Is there a "Leibnitz theorem" for sums with variable limits? Wikipedia says that if we want to differentiate integrals where the variable is in the limit and in the integrand, we can use Leibnitz theorem: But what if I need to integrate a function defined like this:\Sigma_{I(x)}[f(x,t)]...
  19. J

    Can Infinite Sums Be Manipulated by Shifting Terms?

    I was reading the Wikipedia article about the sum 1+2+3+4+..., and I saw this explanation: c = 1+2+3+4+5+6+... 4c = _4__+8__+12+... -3c = 1-2+3-4+5-6+... link: http://en.wikipedia.org/wiki/1_+_2_+_3_+_4_+_%E2%8B%AF My question, as one who hasn't worked with infinite sums: Why are you...
  20. T

    MHB Forming groups as nearly equal in sums as possible

    Hello. I'm not sure what type of problem this is that I'm trying to solve. Any pointers would be greatly appreciated. Suppose you have a list of numbers and you want to form them into, say, 4 groups such that the sum of each group is, as nearly as possible, equal to the sums of each of the...
  21. D

    Solve Complex Number Equations: Ib & Ia

    Ib= (-12.4-j6.88)-(9.57-j6.38) Ib= -12.4-j6.88-9.57+j6.38 Ib=(-22-j0.5)A Why does the -j6.38 become +j6.38? Ia=(9.57-j6.38)-(0.454+j13) Ia= 9.57-j6.38-0.454-j13 Why does the +J13 become -J13? Thanks
  22. C

    Geometric Sequence (Only 4 terms and their sums are given)

    Homework Statement "In a geometric sequence, the sum of t7 and t8 is 5832, the sum of t2 and t3 is 24. Find the common ratio and first term." Homework Equations d = t8/t7 or t3/t2 tn = a * rn-1 The Attempt at a Solution So I thought of developing a system of equations then solving...
  23. O

    How to Find the Apothem of a Regular Polygon

    Prove that \sum_{k=0}^{n} \sin\left( \frac{k \pi}{n} \right) = \cot \left( \frac{\pi}{2n} \right)
  24. Math Amateur

    MHB Sums of Ideals - R. Y. Sharp "Steps in Commutative Algebra"

    In R. Y. Sharp "Steps in Commutative Algebra", Section 2.23 on sums of ideals reads as follows: ------------------------------------------------------------------------------ 2.23 SUMS OF IDEALS. Let ( {I_{\lambda})}_{\lambda \in \Lambda} be a family of ideals of the commutative ring R . We...
  25. mesa

    What are some sums of infinite series that are = to 'e'?

    We all know about the sum of the infinite series, 1 + 1/1! + 1/2! + 1/3! + ... to 1/inf! = e What other series do we have that are equal to 'e'?
  26. K

    Using sigma sums to estimate the area under a curve

    Homework Statement My apologies in advance for the messiness of the equations; the computers available to us do not correctly process the LaTex code. I am tasked with estimating the area under the curve f(x)=x2+1 on the interval [0,2] using 16 partitions. Online calculators and my...
  27. S

    MHB Infinite Sums Involving cube of Central Binomial Coefficient

    Show that $$ \begin{align*} \sum_{n=0}^\infty \binom{2n}{n}^3 \frac{(-1)^n}{4^{3n}} &= \frac{\Gamma\left(\frac{1}{8}\right)^2\Gamma\left(\frac{3}{8}\right)^2}{2^{7/2}\pi^3} \tag{1}\\ \sum_{n=0}^\infty \binom{2n}{n}^3 \frac{1}{4^{3n}}&= \frac{\pi}{\Gamma \left(\frac{3}{4}\right)^4}\tag{2}...
  28. MarkFL

    MHB Ally Samaniego's question at Yahoo Answers regarding partial sums

    Here are the questions: I have posted a link there to this thread so the OP can see my work.
  29. I

    Upper & Lower Sums: Calculating & Understanding Mi & mi

    I am really having trouble understanding how upper and lower sums are calculated. In the equations Ʃf(Mi)Δx and Ʃf(mi)Δx, what do Mi and mi represent?
  30. P

    MATLAB - forming an array of sums?

    Hi, Homework Statement I am asked to evaluate the following sum S=Sigma(n=0 to N) x^n/n! (namely, e^x as n->Inf) for N=10:10:100 and x=10, so that every element S(i) is a partial sum which approximates function e^x with different accuracy. Below is my code, which doesn't work. Homework...
  31. S

    MHB Product of Sums Design Problem

    Need someone to check my answer please. Consider a 4 input, 1 output digital system (W,X,Y,Z, and f respectively) . Design a POS circuit with any number of inputs such that f(W,X,Y,Z) = M(0,2,4,9,13) + D(6,14). First fill in the Truth Table, then find the minimum product of sums equation using...
  32. S

    MHB Product of Sums Minimization KMap (Problem #2)

    Write out the minimal Product of Sums (POS) equation with the following Karnaugh Map. Just need someone to check my work please. I am questioning my self on my grouping. Did I group correctly or should I have grouped the bottom left 0 and D versus the 0 in the group of 8? Thanks for your time...
  33. S

    MHB Given a K map, minimize the Product of Sums

    Awesome thanks.. Mind checking this as well? Minimize Sum of Products equation given the following K map. My Answer: \bar{y} \bar{w} + wx + y\bar{z}w + yw\bar{x}
  34. S

    MHB Product of Sums Problem. Can someone check my work? Couldn't find the problem via Google.

    Just need someone to check my work. Couldn't find the problem via Google. $f$(W,X,Y,Z) M (0,1,2,7,12,15) + d(3,13). 1)Find the minimum Product of Sums equation using a K-Map. 2)Draw a schematic of a minimized circuit implementing the logic using NOR gates. 1) My Answer: (\bar{w} +...
  35. I

    Question about isomorphic mapping on direct sums?

    The identity map on the direct sum of V1 and V2 would be i1 composed with p1 + i2 composed with p2. Would such an identity map exist for an infinite direct sum? And an analogous mapping for a direct product?
  36. Math Amateur

    MHB Direct Products and Sums of Modules - Notation - 2nd Post

    I am reading John Dauns book "Modules and Rings". I am having problems understanding the notation of Section 1-2 Direct Products and Sums (pages 5-6) - see attachment). In section 1-2.1 Dauns writes: ================================================== ====== "1-2.1 For any arbitrary...
  37. Math Amateur

    MHB Direct Products and Sums of Modules - Notation

    I am reading John Dauns book "Modules and Rings". I am having problems understanding the notation in section 1-2 (see attachment) My issue is understanding the notation on Section 1-2, subsection 1-2.1 (see attachment). Dauns is dealing with the product \Pi \{ M_i | i \in I \} \equiv \Pi M_i...
  38. paulmdrdo1

    MHB Sums and Products of Rational and Irrational Numbers

    Explain why the sum, the difference, and the product of the rational numbers are rational numbers. Is the product of the irrational numbers necessarily irrational? What about the sum? Combining Rational Numbers with Irrational Numbers In general, what can you say about the sum of a rational...
  39. MarkFL

    MHB Products and Sums and Proofs....oh, my

    Prove that: \prod_{j=2}^n\left(1-\frac{1}{\sum\limits_{k=1}^j(k)} \right)=\frac{n+2}{3n}
  40. C

    Does the sum of ln(k/(k+1)) converge or diverge as n approaches infinity?

    So I was trying to see if \Sigmaln(\frac{n}{n+1}) diverges or converges. To see this I started writing out [ln(1) - ln(2)] + [ln(2) - ln(3)] + [ln(4) - ln(5)] ... I noticed that after ln(1) everything must cancel out so I reasoned that the series must converge on ln(1) which equals ZERO...
  41. J

    Is it possible to transform infinite sums into infinite products?

    is it also possible to transform any these kinds summation to any product notation: 1. infinite - convergent 2. infinite - divergent 3. finite (but preserves the "description" of the sequence) For example, I could describe the number 6, from the summation of i from i=0 until 3. Could I...
  42. P

    Differentiate the function (derivatives, difference of sums rule)

    Homework Statement Differentiate f(x) = x^{1/2} - x^{1/3} Homework Equations f(x) = f'(x)- g'(x) The Attempt at a Solution I am a little stuck about what to do after the first couple steps. Here is my attempt. f(x) = x^{1/2} - x^{1/3} f'(x) = (x^{1/2})' -(x^{1/3})' =...
  43. Mandelbroth

    Changing the order of different kinds of sums

    I'm having trouble understanding this. Suppose I have a sum ##\displaystyle \sum_{i=1}^{n}\left[\int_{a}^{b} f(t) dt\right]##, where f(t) depends on both n and i. Under what conditions could this expression be equal to the same expression with the integral and the summation in reversed order...
  44. D

    Proving that two double sums are equal

    Homework Statement Let \{a_{n,k}:n,k\in\mathbb{N}\}\subseteq[0,\infty). Prove that \sum\limits_{n=0}^{\infty}\sum\limits_{k=0}^{n}a_{n,k}=\sum\limits_{k=0}^{\infty}\sum\limits_{n=k}^{\infty}a_{n,k}. Homework Equations The Attempt at a Solution I am pretty certain that the claim is...
  45. H

    Closed form for (in)finite sums

    I have a set of questions concerning the perennial sum \large \sum_{k=1}^{n}k^p and its properties. 1. For p \ge 0, the closed form of this is known (via Faulhaber's formula). I know little about divergent series, but I've read that in some sense there exists a value associated with these sums...
  46. S

    Solve Reimann Sums and Integrals

    We are already introduced to finding the value of definite integral by the anti-derivative approach \int_{a}^{b}f(x) dx = F(b) - F(a) In this approach we find the anti-derivative F(x) of f(x) and then subtract F(a) from F(b) to get the value of the definite integral Reimann Sums...
  47. M

    Discrete Time Convolution of Sums

    Evaluate the following discrete-time convolution: y[n] = cos(\frac{1}{2}\pin)*2^{n}u[-n+2] Here is my sloppy attempt: y[n] = \sumcos(\frac{1}{2}\pik)2^{n-k}u[-n-k+2] from k = -∞ to ∞ = \sumcos(\frac{1}{2}\pik)2^{n-k} from k = -∞ to 2 We can re-write the cos as...
  48. H

    Finding limit of sum using Riemann Sums

    Find the limit limn→∞∑i=1 i/n^2+i^2 by expressing it as a definite integral of an appropriate function via Riemann sums ...?
  49. T

    Subsequence that Sums Up to Half the Total Sum

    Hi all, I was just looking at the U.S. electoral map, and I was wondering if there could possibly be a tie in presidential elections (the answer is probably no). I tried to think of an efficient algorithm to answer this question, but due to my limited intelligence and imagination, all I...
  50. M

    Swapping Integrals and Sums: When is it Justifiable?

    when using the reimann integral over infinite sums, when is it justifiable to interchange the integral and the sum? \int\displaystyle\sum_{i=1}^{\infty} f_i(x)dx=\displaystyle\sum_{i=1}^{\infty} \int f_i(x)dx thanks ahead for the help!
Back
Top