متتالية حسابية

The sum of the members of a finite arithmetic progression is called an arithmetic series. For example, consider the sum:

${\displaystyle 2+5+8+11+14}$ 

This sum can be found quickly by taking the number n of terms being added (here 5), multiplying by the sum of the first and last number in the progression (here 2 + 14 = 16), and dividing by 2:

${\displaystyle {\frac {n(a_{1}+a_{n})}{2}}}$ 

In the case above, this gives the equation:

${\displaystyle 2+5+8+11+14={\frac {5(2+14)}{2}}={\frac {5\times 16}{2}}=40.}$ 

This formula works for any real numbers ${\displaystyle a_{1}}$  and ${\displaystyle a_{n}}$ . For example:

${\displaystyle \left(-{\frac {3}{2}}\right)+\left(-{\frac {1}{2}}\right)+{\frac {1}{2}}={\frac {3\left(-{\frac {3}{2}}+{\frac {1}{2}}\right)}{2}}=-{\frac {3}{2}}.}$ 

 الاشتقاق

To derive the above formula, begin by expressing the arithmetic series in two different ways:

${\displaystyle S_{n}=a_{1}+(a_{1}+d)+(a_{1}+2d)+\cdots +(a_{1}+(n-2)d)+(a_{1}+(n-1)d)}$ 

${\displaystyle S_{n}=(a_{n}-(n-1)d)+(a_{n}-(n-2)d)+\cdots +(a_{n}-2d)+(a_{n}-d)+a_{n}.}$ 

Adding both sides of the two equations, all terms involving d cancel:

${\displaystyle \ 2S_{n}=n(a_{1}+a_{n}).}$ 

Dividing both sides by 2 produces a common form of the equation:

${\displaystyle S_{n}={\frac {n}{2}}(a_{1}+a_{n}).}$ 

An alternate form results from re-inserting the substitution: ${\displaystyle a_{n}=a_{1}+(n-1)d}$ :

${\displaystyle S_{n}={\frac {n}{2}}[2a_{1}+(n-1)d].}$ 

Furthermore, the mean value of the series can be calculated via: ${\displaystyle S_{n}/n}$ :

${\displaystyle {\overline {n}}={\frac {a_{1}+a_{n}}{2}}.}$ 

The formula is very similar to the mean of a discrete uniform distribution.

In 499 AD Aryabhata, a prominent mathematician-astronomer from the classical age of Indian mathematics and Indian astronomy, gave this method in the Aryabhatiya (section 2.18).

According to an anecdote, young Carl Friedrich Gauss reinvented this method to compute the sum 1+2+3+...+99+100 for a punishment in primary school.

The product of the members of a finite arithmetic progression with an initial element a₁, common differences d, and n elements in total is determined in a closed expression

${\displaystyle a_{1}a_{2}\cdots a_{n}=d{\frac {a_{1}}{d}}d\left({\frac {a_{1}}{d}}+1\right)d\left({\frac {a_{1}}{d}}+2\right)\cdots d\left({\frac {a_{1}}{d}}+n-1\right)=d^{n}{\left({\frac {a_{1}}{d}}\right)}^{\overline {n}}=d^{n}{\frac {\Gamma \left(a_{1}/d+n\right)}{\Gamma \left(a_{1}/d\right)}},}$ 

where ${\displaystyle x^{\overline {n}}}$  denotes the rising factorial and ${\displaystyle \Gamma }$  denotes the Gamma function. (The formula is not valid when ${\displaystyle a_{1}/d}$  is a negative integer or zero.)^{[بحاجة لمصدر]}

This is a generalization from the fact that the product of the progression ${\displaystyle 1\times 2\times \cdots \times n}$  is given by the factorial ${\displaystyle n!}$  and that the product

${\displaystyle m\times (m+1)\times (m+2)\times \cdots \times (n-2)\times (n-1)\times n}$ 

for positive integers ${\displaystyle m}$  and ${\displaystyle n}$  is given by

${\displaystyle {\frac {n!}{(m-1)!}}.}$ 

Taking the example 3, 8, 13, 18, 23, 28, ..., the product of the terms of the arithmetic progression given by a_n = 3 + (n-1)×5 up to the 50th term is

${\displaystyle P_{50}=5^{50}\cdot {\frac {\Gamma \left(3/5+50\right)}{\Gamma \left(3/5\right)}}\approx 3.78438\times 10^{98}.}$ 

The standard deviation of any arithmetic progression can be calculated as

${\displaystyle \sigma =|d|{\sqrt {\frac {(n-1)(n+1)}{12}}}}$ 

where ${\displaystyle n}$  is the number of terms in the progression and ${\displaystyle d}$  is the common difference between terms. The formula is very similar to the standard deviation of a discrete uniform distribution.

The intersection of any two doubly infinite arithmetic progressions is either empty or another arithmetic progression, which can be found using the Chinese remainder theorem. If each pair of progressions in a family of doubly infinite arithmetic progressions have a non-empty intersection, then there exists a number common to all of them; that is, infinite arithmetic progressions form a Helly family.^[1] However, the intersection of infinitely many infinite arithmetic progressions might be a single number rather than itself being an infinite progression.

If

${\displaystyle a_{1}}$  is the first term of an arithmetic progression.

${\displaystyle a_{n}}$  is the nth term of an arithmetic progression.

${\displaystyle d}$  is the difference between terms of the arithmetic progression.

${\displaystyle n}$  is the number of terms in the arithmetic progression.

${\displaystyle S_{n}}$  is the sum of n terms in the arithmetic progression.

${\displaystyle {\overline {n}}}$  is the mean value of arithmetic series.

then

1. ${\displaystyle \ a_{n}=a_{1}+(n-1)d,}$ 

2. ${\displaystyle \ a_{n}=a_{m}+(n-m)d.}$ 

3. ${\displaystyle S_{n}={\frac {n}{2}}[2a_{1}+(n-1)d].}$ 

4. ${\displaystyle S_{n}={\frac {n}{2}}(a_{1}+a_{n}).}$ 

5. ${\displaystyle {\overline {n}}}$  = ${\displaystyle S_{n}/n}$ 

6. ${\displaystyle {\overline {n}}={\frac {a_{1}+a_{n}}{2}}.}$ 

7. ${\displaystyle d={\frac {a_{m}-a_{n}}{m-n}};m\neq n}$ .

• Primes in arithmetic progression
• Linear difference equation
• Arithmetico-geometric sequence
• Generalized arithmetic progression, a set of integers constructed as an arithmetic progression is, but allowing several possible differences
• Harmonic progression
• Heronian triangles with sides in arithmetic progression
• Problems involving arithmetic progressions
• Utonality

• Sigler, Laurence E. (trans.) (2002). Fibonacci's Liber Abaci. Springer-Verlag. pp. 259–260. ISBN 0-387-95419-8.

• Hazewinkel, Michiel, ed. (2001), "Arithmetic series", Encyclopaedia of Mathematics, Kluwer Academic Publishers, ISBN 978-1556080104 
• Eric W. Weisstein, Arithmetic progression at MathWorld.
• Eric W. Weisstein, Arithmetic series at MathWorld.