Binomial theorem

The binomial coefficients appear as the entries of Pascal's triangle where each entry is the sum of the two above it.

In elementary algebra, the binomial theorem (or binomial expansion) describes the algebraic expansion of powers of a binomial. According to the theorem, it is possible to expand the power (x + y)n into a sum involving terms of the form a xbyc, where the exponents b and c are nonnegative integers with b + c = n, and the coefficient a of each term is a specific positive integer depending on n and b. For example,

(x+y)^4 \;=\; x^4 \,+\, 4 x^3y \,+\, 6 x^2 y^2 \,+\, 4 x y^3 \,+\, y^4.

The coefficient a in the term of a xbyc is known as the binomial coefficient \tbinom nb or \tbinom nc (the two have the same value). These coefficients for varying n and b can be arranged to form Pascal's triangle. These numbers also arise in combinatorics, where \tbinom nb gives the number of different combinations of b elements that can be chosen from an n-element set.

History

Special cases of the binomial theorem were known from ancient times. The 4th century B.C. Greek mathematician Euclid mentioned the special case of the binomial theorem for exponent 2.[1][2] There is evidence that the binomial theorem for cubes was known by the 6th century in India.[1][2]

Binomial coefficients, as combinatorial quantities expressing the number of ways of selecting k objects out of n without replacement, were of interest to the ancient Hindus. The earliest known reference to this combinatorial problem is the Chandaḥśāstra by the Hindu lyricist Pingala (c. 200 B.C.), which contains a method for its solution.[3]:230 The commentator Halayudha from the 10th century A.D. explains this method using what is now known as Pascal's triangle.[3] By the 6th century A.D., the Hindu mathematicians probably knew how to express this as a quotient \frac{n!}{(n-k)!k!},[4] and a clear statement of this rule can be found in the 12th century text Lilavati by Bhaskara.[4]

The binomial theorem as such can be found in the work of 11th-century Persian mathematician Al-Karaji, who described the triangular pattern of the binomial coefficients.[5] He also provided a mathematical proof of both the binomial theorem and Pascal's triangle, using a primitive form of mathematical induction.[5] The Persian poet and mathematician Omar Khayyam was probably familiar with the formula to higher orders, although many of his mathematical works are lost.[2] The binomial expansions of small degrees were known in the 13th century mathematical works of Yang Hui[6] and also Chu Shih-Chieh.[2] Yang Hui attributes the method to a much earlier 11th century text of Jia Xian, although those writings are now also lost.[3]:142

In 1544, Michael Stifel introduced the term "binomial coefficient" and showed how to use them to express (1+a)^n in terms of (1+a)^{n-1}, via "Pascal's triangle".[7] Blaise Pascal studied the eponymous triangle comprehensively in the treatise Traité du triangle arithmétique (1653). However, the pattern of numbers was already known to the European mathematicians of the late Renaissance, including Stifel, Niccolò Fontana Tartaglia, and Simon Stevin.[7]

Isaac Newton is generally credited with the generalised binomial theorem, valid for any rational exponent.[7][8]

Statement of the theorem

According to the theorem, it is possible to expand any power of x + y into a sum of the form

(x+y)^n = {n \choose 0}x^n y^0 + {n \choose 1}x^{n-1}y^1 + {n \choose 2}x^{n-2}y^2 + \cdots + {n \choose n-1}x^1 y^{n-1} + {n \choose n}x^0 y^n,

where each  \tbinom nk is a specific positive integer known as a binomial coefficient. (When an exponent is zero, the corresponding power expression is taken to be 1 and this multiplicative factor is often omitted from the term. Hence one often sees the right side written as \binom{n}{0} x^n + \ldots.) This formula is also referred to as the binomial formula or the binomial identity. Using summation notation, it can be written as

(x+y)^n = \sum_{k=0}^n {n \choose k}x^{n-k}y^k = \sum_{k=0}^n {n \choose k}x^{k}y^{n-k}.

The final expression follows from the previous one by the symmetry of x and y in the first expression, and by comparison it follows that the sequence of binomial coefficients in the formula is symmetrical. A simple variant of the binomial formula is obtained by substituting 1 for y, so that it involves only a single variable. In this form, the formula reads

(1+x)^n = {n \choose 0}x^0 + {n \choose 1}x^1 + {n \choose 2}x^2 + \cdots + {n \choose {n-1}}x^{n-1} + {n \choose n}x^n,

or equivalently

(1+x)^n = \sum_{k=0}^n {n \choose k}x^k.

Examples

Pascal's triangle

The most basic example of the binomial theorem is the formula for the square of x + y:

(x + y)^2 = x^2 + 2xy + y^2.\!

The binomial coefficients 1, 2, 1 appearing in this expansion correspond to the second row of Pascal's triangle. (Note that the top "1" of the triangle is considered to be row 0, by convention.) The coefficients of higher powers of x + y correspond to lower rows of the triangle:


\begin{align}
 \\[8pt]
(x+y)^3 & = x^3 + 3x^2y + 3xy^2 + y^3, \\[8pt]
(x+y)^4 & = x^4 + 4x^3y + 6x^2y^2 + 4xy^3 + y^4, \\[8pt]
(x+y)^5 & = x^5 + 5x^4y + 10x^3y^2 + 10x^2y^3 + 5xy^4 + y^5, \\[8pt]
(x+y)^6 & = x^6 + 6x^5y + 15x^4y^2 + 20x^3y^3 + 15x^2y^4 + 6xy^5 + y^6, \\[8pt]
(x+y)^7 & = x^7 + 7x^6y + 21x^5y^2 + 35x^4y^3 + 35x^3y^4 + 21x^2y^5 + 7xy^6 + y^7.
\end{align}

Several patterns can be observed from these examples. In general, for the expansion (x + y)n:

  1. the powers of x start at n and decrease by 1 in each term until they reach 0 (with {{{1}}} often unwritten);
  2. the powers of y start at 0 and increase by 1 until they reach n;
  3. the nth row of Pascal's Triangle will be the coefficients of the expanded binomial when the terms are arranged in this way;
  4. the number of terms in the expansion before like terms are combined is the sum of the coefficients and is equal to 2n; and
  5. there will be n + 1 terms in the expression after combining like terms in the expansion.

The binomial theorem can be applied to the powers of any binomial. For example,

\begin{align}
(x+2)^3 &= x^3 + 3x^2(2) + 3x(2)^2 + 2^3 \\
&= x^3 + 6x^2 + 12x + 8.\end{align}

For a binomial involving subtraction, the theorem can be applied by using the form (xy)n = (x + (−y))n. This has the effect of changing the sign of every other term in the expansion:

(x-y)^3 = (x+(-y))^3 = x^3 + 3x^2(-y) + 3x(-y)^2 + (-y)^3 = x^3 - 3x^2y + 3xy^2 -y^3.

Geometric explanation

Visualisation of binomial expansion up to the 4th power

For positive values of a and b, the binomial theorem with n = 2 is the geometrically evident fact that a square of side a + b can be cut into a square of side a, a square of side b, and two rectangles with sides a and b. With n = 3, the theorem states that a cube of side a + b can be cut into a cube of side a, a cube of side b, three a×a×b rectangular boxes, and three a×b×b rectangular boxes.

In calculus, this picture also gives a geometric proof of the derivative (x^n)'=nx^{n-1}:[9] if one sets a=x and b=\Delta x, interpreting b as an infinitesimal change in a, then this picture shows the infinitesimal change in the volume of an n-dimensional hypercube, (x+\Delta x)^n, where the coefficient of the linear term (in \Delta x) is nx^{n-1}, the area of the n faces, each of dimension (n-1):

(x+\Delta x)^n = x^n + nx^{n-1}\Delta x + \tbinom{n}{2}x^{n-2}(\Delta x)^2 + \cdots.

Substituting this into the definition of the derivative via a difference quotient and taking limits means that the higher order terms – (\Delta x)^2 and higher – become negligible, and yields the formula (x^n)'=nx^{n-1}, interpreted as

"the infinitesimal change in volume of an n-cube as side length varies is the area of n of its (n-1)-dimensional faces".

If one integrates this picture, which corresponds to applying the fundamental theorem of calculus, one obtains Cavalieri's quadrature formula, the integral \textstyle{\int x^{n-1}\,dx = \tfrac{1}{n} x^n} – see proof of Cavalieri's quadrature formula for details.[9]

The binomial coefficients

Main article: Binomial coefficient

The coefficients that appear in the binomial expansion are called binomial coefficients. These are usually written  \tbinom nk , and pronounced “n choose k”.

Formulae

The coefficient of xnkyk is given by the formula

{n \choose k} = \frac{n!}{k!\,(n-k)!}

which is defined in terms of the factorial function n!. Equivalently, this formula can be written

{n \choose k} = \frac{n (n-1) \cdots (n-k+1)}{k (k-1) \cdots 1} = \prod_{\ell=1}^k \frac{n-\ell+1}{\ell} = \prod_{\ell=0}^{k-1} \frac{n-\ell}{k - \ell}

with k factors in both the numerator and denominator of the fraction. Note that, although this formula involves a fraction, the binomial coefficient  \tbinom nk is actually an integer.

Combinatorial interpretation

The binomial coefficient  \tbinom nk can be interpreted as the number of ways to choose k elements from an n-element set. This is related to binomials for the following reason: if we write (x + y)n as a product

(x+y)(x+y)(x+y)\cdots(x+y),

then, according to the distributive law, there will be one term in the expansion for each choice of either x or y from each of the binomials of the product. For example, there will only be one term xn, corresponding to choosing x from each binomial. However, there will be several terms of the form xn−2y2, one for each way of choosing exactly two binomials to contribute a y. Therefore, after combining like terms, the coefficient of xn−2y2 will be equal to the number of ways to choose exactly 2 elements from an n-element set.

Proofs

Combinatorial proof

Example

The coefficient of xy2 in

\begin{align}
(x+y)^3 &= (x+y)(x+y)(x+y) \\
&= xxx + xxy + xyx + \underline{xyy} + yxx + \underline{yxy} + \underline{yyx} + yyy \\
&= x^3 + 3x^2y + \underline{3xy^2} + y^3.
\end{align} \,

equals \tbinom{3}{2}=3 because there are three x,y strings of length 3 with exactly two y's, namely,

xyy, \; yxy, \; yyx,

corresponding to the three 2-element subsets of { 1, 2, 3 }, namely,

\{2,3\},\;\{1,3\},\;\{1,2\},

where each subset specifies the positions of the y in a corresponding string.

General case

Expanding (x + y)n yields the sum of the 2 n products of the form e1e2 ... e n where each e i is x or y. Rearranging factors shows that each product equals xnkyk for some k between 0 and n. For a given k, the following are proved equal in succession:

This proves the binomial theorem.

Inductive proof

Induction yields another proof of the binomial theorem. When n = 0, both sides equal 1, since x0 = 1 and \tbinom{0}{0}=1. Now suppose that the equality holds for a given n; we will prove it for n + 1. For j, k  0, let [ƒ(x, y)] j,k denote the coefficient of xjyk in the polynomial ƒ(x, y). By the inductive hypothesis, (x + y)n is a polynomial in x and y such that [(x + y)n] j,k is \tbinom{n}{k} if j + k = n, and 0 otherwise. The identity

 (x+y)^{n+1} = x(x+y)^n + y(x+y)^n, \,

shows that (x + y)n+1 also is a polynomial in x and y, and

 [(x+y)^{n+1}]_{j,k} = [(x+y)^n]_{j-1,k} + [(x+y)^n]_{j,k-1},

since if j + k = n + 1, then (j  1) + k = n and j + (k  1) = n. Now, the right hand side is

 \binom{n}{k} + \binom{n}{k-1} = \binom{n+1}{k},

by Pascal's identity.[10] On the other hand, if j +k  n + 1, then (j  1) + k  n and j +(k  1)  n, so we get 0 + 0 = 0. Thus

(x+y)^{n+1} = \sum_{k=0}^{n+1} \tbinom{n+1}{k} x^{n+1-k} y^k,

which is the inductive hypothesis with n + 1 substituted for n and so completes the inductive step.

Generalisations

Newton's generalised binomial theorem

Main article: Binomial series

Around 1665, Isaac Newton generalised the binomial theorem to allow real exponents other than nonnegative integers. (The same generalisation also applies to complex exponents.) In this generalisation, the finite sum is replaced by an infinite series. In order to do this, one needs to give meaning to binomial coefficients with an arbitrary upper index, which cannot be done using the usual formula with factorials. However, for an arbitrary number r, one can define

{r \choose k}=\frac{r\,(r-1) \cdots (r-k+1)}{k!} =\frac{(r)_k}{k!},

where (\cdot)_k is the Pochhammer symbol, here standing for a falling factorial. This agrees with the usual definitions when r is a nonnegative integer. Then, if x and y are real numbers with |x| > |y|,[Note 1] and r is any complex number, one has


\begin{align}
(x+y)^r & =\sum_{k=0}^\infty {r \choose k} x^{r-k} y^k \\
& = x^r + r x^{r-1} y + \frac{r(r-1)}{2!} x^{r-2} y^2 + \frac{r(r-1)(r-2)}{3!} x^{r-3} y^3 + \cdots.
\end{align}

When r is a nonnegative integer, the binomial coefficients for k > r are zero, so this equation reduces to the usual binomial theorem, and there are at most r + 1 nonzero terms. For other values of r, the series typically has infinitely many nonzero terms.

For example, with r = 1/2 gives the following series for the square root:

\sqrt{1+x} = \textstyle 1 + \frac{1}{2}x - \frac{1}{8}x^2 + \frac{1}{16}x^3 - \frac{5}{128}x^4 + \frac{7}{256}x^5 - \cdots

Taking r=-1, the generalized binomial series gives the geometric series formula, valid for |x| < 1:

(1+x)^{-1} = \frac{1}{1+x} = 1 - x + x^2 - x^3 + x^4 - x^5 + \cdots

More generally, with r = s:

\frac{1}{(1-x)^s} = \sum_{k=0}^\infty {s+k-1 \choose k} x^k \equiv \sum_{k=0}^\infty {s+k-1 \choose s-1} x^k.

So, for instance, when s=1/2,

\frac{1}{\sqrt{1+x}} = \textstyle 1 -\frac{1}{2}x + \frac{3}{8}x^2 - \frac{5}{16}x^3 + \frac{35}{128}x^4 - \frac{63}{256}x^5 + \cdots

Generalisations

The generalised binomial theorem can be extended to the case where x and y are complex numbers. For this version, one should again assume |x| > |y|[Note 1] and define the powers of x + y and x using a holomorphic branch of log defined on an open disk of radius |x| centered at x.

The generalised binomial theorem is valid also for elements x and y of a Banach algebra as long as xy = yx, x is invertible, and ||y/x|| < 1.

The multinomial theorem

Main article: Multinomial theorem

The binomial theorem can be generalised to include powers of sums with more than two terms. The general version is

(x_1 + x_2 + \cdots + x_m)^n
 = \sum_{k_1+k_2+\cdots +k_m = n} {n \choose k_1, k_2, \ldots, k_m}
 x_1^{k_1} x_2^{k_2} \cdots x_m^{k_m}.

where the summation is taken over all sequences of nonnegative integer indices k1 through km such that the sum of all ki is n. (For each term in the expansion, the exponents must add up to n). The coefficients  \tbinom n{k_1,\cdots,k_m} are known as multinomial coefficients, and can be computed by the formula

 {n \choose k_1, k_2, \ldots, k_m}
 = \frac{n!}{k_1!\, k_2! \cdots k_m!}.

Combinatorially, the multinomial coefficient \tbinom n{k_1,\cdots,k_m} counts the number of different ways to partition an n-element set into disjoint subsets of sizes k1, ..., km.

The multi-binomial theorem

It is often useful when working in more dimensions, to deal with products of binomial expressions. By the binomial theorem this is equal to

 (x_{1}+y_{1})^{n_{1}}\dotsm(x_{d}+y_{d})^{n_{d}} = \sum_{k_{1}=0}^{n_{1}}\dotsm\sum_{k_{d}=0}^{n_{d}} \binom{n_{1}}{k_{1}}\, x_{1}^{k_{1}}y_{1}^{n_{1}-k_{1}}\;\dotsc\;\binom{n_{d}}{k_{d}}\, x_{d}^{k_{d}}y_{d}^{n_{d}-k_{d}}.

This may be written more concisely, by multi-index notation, as

 (x+y)^\alpha = \sum_{\nu \le \alpha} \binom{\alpha}{\nu} \, x^\nu y^{\alpha - \nu}.

Applications

Multiple-angle identities

For the complex numbers the binomial theorem can be combined with De Moivre's formula to yield multiple-angle formulas for the sine and cosine. According to De Moivre's formula,

\operatorname{cis}(nx) = \cos\left(nx\right)+i\sin\left(nx\right) = \left(\cos x+i\sin x\right)^n = \left(\operatorname{cis\,x}\right)^n.\,

Using the binomial theorem, the expression on the right can be expanded, and then the real and imaginary parts can be taken to yield formulas for cos(nx) and sin(nx). For example, since

\left(\cos x+i\sin x\right)^2 = \cos^2 x + 2i \cos x \sin x - \sin^2 x,

De Moivre's formula tells us that

\cos(2x) = \cos^2 x - \sin^2 x \quad\text{and}\quad\sin(2x) = 2 \cos x \sin x,

which are the usual double-angle identities. Similarly, since

\left(\cos x+i\sin x\right)^3 = \cos^3 x + 3i \cos^2 x \sin x - 3 \cos x \sin^2 x - i \sin^3 x,

De Moivre's formula yields

\cos(3x) = \cos^3 x - 3 \cos x \sin^2 x \quad\text{and}\quad \sin(3x) = 3\cos^2 x \sin x - \sin^3 x.

In general,

\cos(nx) = \sum_{k\text{ even}} (-1)^{k/2} {n \choose k}\cos^{n-k} x \sin^k x

and

\sin(nx) = \sum_{k\text{ odd}} (-1)^{(k-1)/2} {n \choose k}\cos^{n-k} x \sin^k x.

Series for e

The number e is often defined by the formula

e = \lim_{n\to\infty} \left(1 + \frac{1}{n}\right)^n.

Applying the binomial theorem to this expression yields the usual infinite series for e. In particular:

\left(1 + \frac{1}{n}\right)^n = 1 + {n \choose 1}\frac{1}{n} + {n \choose 2}\frac{1}{n^2} + {n \choose 3}\frac{1}{n^3} + \cdots + {n \choose n}\frac{1}{n^n}.

The kth term of this sum is

{n \choose k}\frac{1}{n^k} \;=\; \frac{1}{k!}\cdot\frac{n(n-1)(n-2)\cdots (n-k+1)}{n^k}

As n  ∞, the rational expression on the right approaches one, and therefore

\lim_{n\to\infty} {n \choose k}\frac{1}{n^k} = \frac{1}{k!}.

This indicates that e can be written as a series:

e = \frac{1}{0!} + \frac{1}{1!} + \frac{1}{2!} + \frac{1}{3!} + \cdots.

Indeed, since each term of the binomial expansion is an increasing function of n, it follows from the monotone convergence theorem for series that the sum of this infinite series is equal to e.

Derivative of the power function

In finding the derivative of the power function f(x) = xn for integer n using the definition of derivative, one must expand the binomial (x + h)n.

Nth derivative of a product

To indicate the formula for the derivative of order n of the product of two functions, the formula of the binomial theorem is used symbolically.[11]

The binomial theorem in abstract algebra

Formula (1) is valid more generally for any elements x and y of a semiring satisfying xy = yx. The theorem is true even more generally: alternativity suffices in place of associativity.

The binomial theorem can be stated by saying that the polynomial sequence { 1, x, x2, x3, ... } is of binomial type.

In popular culture

See also

Notes

  1. 1 2 This is to guarantee convergence. Depending on r, the series may also converge sometimes when |x| = |y|.

References

  1. 1 2 Weisstein, Eric W. "Binomial Theorem". Wolfram MathWorld.
  2. 1 2 3 4 Coolidge, J. L. (1949). "The Story of the Binomial Theorem". The American Mathematical Monthly 56 (3): 147–157. doi:10.2307/2305028.
  3. 1 2 3 Jean-Claude Martzloff; S.S. Wilson; J. Gernet; J. Dhombres (1987). A history of Chinese mathematics. Springer.
  4. 1 2 Biggs, N. L. (1979). "The roots of combinatorics". Historia Math. 6 (2): 109–136. doi:10.1016/0315-0860(79)90074-0.
  5. 1 2 O'Connor, John J.; Robertson, Edmund F., "Abu Bekr ibn Muhammad ibn al-Husayn Al-Karaji", MacTutor History of Mathematics archive, University of St Andrews.
  6. Landau, James A. (1999-05-08). "Historia Matematica Mailing List Archive: Re: [HM] Pascal's Triangle" (mailing list email). Archives of Historia Matematica. Retrieved 2007-04-13.
  7. 1 2 3 Kline, Morris (1972). History of mathematical thought. Oxford University Press. p. 273.
  8. Bourbaki, N. (18 November 1998). Elements of the History of Mathematics Paperback. J. Meldrum (Translator). ISBN 978-3-540-64767-6.
  9. 1 2 Barth, Nils R. (2004). "Computing Cavalieri's Quadrature Formula by a Symmetry of the n-Cube". The American Mathematical Monthly (Mathematical Association of America) 111 (9): 811–813. doi:10.2307/4145193. ISSN 0002-9890. JSTOR 4145193, author's copy, further remarks and resources
  10. Binomial theorem – inductive proofs Archived February 24, 2015, at the Wayback Machine.
  11. Seely, Robert T. (1973). Calculus of One and Several Variables. Glenview: Scott, Foresman. ISBN 0-673-07779-9.
  12. "Arquivo Pessoa: Obra Édita - O binómio de Newton é tão belo como a Vénus de Milo.". arquivopessoa.net.

Further reading

External links

The Wikibook Combinatorics has a page on the topic of: The Binomial Theorem

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