Binomial theorem: Difference between revisions

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In [[elementary algebra]], the '''binomial theorem''' is the identity that states that for any non-negative [[integer]] ''n'',
In [[elementary algebra]], the '''binomial theorem''' or the binomial expansion is a mechanism by which expressions of the form <math>(x + y)^n</math> can be expanded. It is the identity that states that for any non-negative [[integer]] ''n'',


: <math> (x + y)^n = \sum_{k=0}^n {n \choose k} x^k y^{n-k}, </math>
: <math> (x + y)^n = \sum_{k=0}^n {n \choose k} x^k y^{n-k}, </math>


or, equivalently,
where
 
: <math> {n \choose k} = \frac{n!}{k!(n - k)!} </math>
 
is a [[binomial coefficient]]. Another useful way of stating it is the following:
 
<math>(x + y)^n = {n \choose 0} x^n + {n \choose 1} x^{n-1} y + {n \choose 2} x^{n-2} y^2 + \ldots + {n \choose n} y^n</math>
 
===Pascal's triangle===
 
An alternate way to find the binomial coefficients is by using [[Pascal's triange]]. The triangle is built from apex down, starting with the number one alone on a row. Each number is equal to the sum of the two numbers directly above it.


: <math> (x + y)^n = \sum_{k=0}^n {n \choose k} y^k x^{n-k}, </math>
n=0        1
n=1        1 1
n=2      1 2 1
n=3      1 3 3 1
n=4    1 4 6 4 1
n=5  1 5 10 10 5 1


where
Thus, the binomial coefficients for the expression <math>(x + y)^4</math> are 1, 3, 6, 4, and 1.


: <math> {n \choose k} = \frac{n!}{k!(n - k)!}. </math>
==Proof==


One way to prove this identity is by [[mathematical induction]].
One way to prove this identity is by [[mathematical induction]].


== The first several cases ==
'''Base case''': n = 0
: <math> (x + y)^0 = \sum_{k=0}^0 {0 \choose k} x^{0-k} y^k = 1 </math>
 
'''Induction case''': Now suppose that it is true for n : <math> (x + y)^n = \sum_{k=0}^n {n \choose k} x^{n-k} y^k, </math> and prove it for n + 1.
 
:<math> (x+y)^{n+1} = (x+y)(x+y)^n  \,</math>
 
::::<math> = (x+y) \sum_{k=0}^n {n \choose k} x^{n-k} y^k \,</math>
 
::::<math> = \sum_{k=0}^n {n \choose k} x^{n+1-k} y^k + \sum_{j=0}^n {n \choose j} x^{n-j} y^{j+1} \,</math>
 
::::<math> = \sum_{k=0}^n {n \choose k} x^{n+1-k} y^k + \sum_{j=0}^n {n \choose {(j+1) -1}} x^{n-j} y^{j+1} \,</math>
 
::::<math> = \sum_{k=0}^n {n \choose k} x^{n+1-k} y^k + \sum_{k=1}^{n+1} {n \choose {k -1}} x^{n+1-k} y^k \,</math>
 
::::<math> = \sum_{k=0}^{n+1} {n \choose k} x^{n+1-k} y^k - {n \choose {n+1}} x^0 y^{n+1}+ \sum_{k=0}^{n+1} {n \choose {k -1}} x^{n+1-k} y^k - {n \choose {-1}}x^{n+1} y^0  \,</math>
 
::::<math> = \sum_{k=0}^{n+1} \left[ {n \choose k} + {n \choose {k -1}} \right] x^{n+1-k} y^k \,</math>
 
::::<math> = \sum_{k=0}^{n+1} {{n+1} \choose k} x^{n+1-k} y^k, </math>
 
and the proof is complete.
 
== Examples ==
 
These are the expansions from 0 to 6.


<math> \begin{align}
<math> \begin{align}
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== Newton's binomial theorem ==
== Newton's binomial theorem ==


There is also '''Newton's binomial theorem''', proved by [[Isaac Newton]], that goes beyond elementary algebra into mathematical analysis, which expands the same sum (''x''&nbsp;+&nbsp;''y'')<sup>''n''</sup> as an infinite series when ''n'' is not an integer or is not positive.
There is also '''Newton's binomial theorem''', proved by [[Isaac Newton]], that goes beyond elementary algebra into mathematical analysis, which expands the same sum (''x''&nbsp;+&nbsp;''y'')<sup>''n''</sup> as an infinite series when ''n'' is not an integer or is not positive.[[Category:Suggestion Bot Tag]]

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In elementary algebra, the binomial theorem or the binomial expansion is a mechanism by which expressions of the form can be expanded. It is the identity that states that for any non-negative integer n,

where

is a binomial coefficient. Another useful way of stating it is the following:

Pascal's triangle

An alternate way to find the binomial coefficients is by using Pascal's triange. The triangle is built from apex down, starting with the number one alone on a row. Each number is equal to the sum of the two numbers directly above it.

n=0         1
n=1        1 1
n=2       1 2 1
n=3      1 3 3 1
n=4     1 4 6 4 1
n=5   1 5 10 10 5 1

Thus, the binomial coefficients for the expression are 1, 3, 6, 4, and 1.

Proof

One way to prove this identity is by mathematical induction.

Base case: n = 0

Induction case: Now suppose that it is true for n : and prove it for n + 1.

and the proof is complete.

Examples

These are the expansions from 0 to 6.

Newton's binomial theorem

There is also Newton's binomial theorem, proved by Isaac Newton, that goes beyond elementary algebra into mathematical analysis, which expands the same sum (x + y)n as an infinite series when n is not an integer or is not positive.