Binomial theorem
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In mathematics, the binomial theorem is an important formula giving the expansion of powers of sums. Its simplest version reads
- [(x+y)^n=\sum_^nx^ky^\quad\quad\quad(1)]
- [=\frac]
This formula, and the triangular arrangement of the binomial coefficients, are often attributed to Blaise Pascal who described them in the 17th century. It was, however, known to the Chinese mathematician Yang Hui in the 13th century, the earlier Persian mathematician Omar Khayyám in the 11th century, and the even earlier Indian mathematician Pingala in the 3rd century BC.
For example, here are the cases n = 2, n = 3 and n = 4:
- [(x + y)^2 = x^2 + 2xy + y^2\,]
- [(x + y)^3 = x^3 + 3x^2y + 3xy^2 + y^3\,]
- [(x + y)^4 = x^4 + 4x^3y + 6x^2y^2 + 4xy^3 + y^4.\,]
Newton's generalized binomial theorem
Isaac Newton generalized the formula to other exponents by considering an infinite series:
- [^\infty x^k y^\quad\quad\quad(2)}]
- [=\prod_^(r-n)=\frac\,]
Another way to express this quantity is
- [=\frac(-r)_k,]
A particularly handy but non-obvious form holds for the reciprocal power:
- [\frac=\sum_^\infty x^k \equiv \sum_^\infty x^k.]
The sum in (2) converges and the equality is true whenever the real or complex numbers x and y are "close together" in the sense that the absolute value | x/y | is less than one.
The geometric series is a special case of (2) where we choose y = 1 and r = −1.
Formula (2) is also valid for elements x and y of a Banach algebra as long as xy = yx, y is invertible and ||x/y|| < 1.
\"Binomial type\"
The binomial theorem can be stated by saying that the polynomial sequence
- [\left\\,]
Proof
One way to prove the binomial theorem is with mathematical induction. When n = 0, we have
- [ (a+b)^0 = 1 = \sum_^0 a^b^k.]
- [ (a+b)^ = a(a+b)^m + b(a+b)^m \,]
- :[ = a \sum_^m a^ b^k + b \sum_^m a^ b^j] by the inductive hypothesis
- :[ = \sum_^m a^ b^k + \sum_^m a^ b^] by multiplying through by [a] and [b]
- :[ = a^ + \sum_^m a^ b^k + \sum_^m a^ b^] by pulling out the [k=0] term
- :[ = a^ + \sum_^m a^ b^k + \sum_^ a^b^] by letting [ j = k-1]
- :[ = a^ + \sum_^m a^b^k + \sum_^ a^b^ + b^] by pulling out the [ k=m+1] term from the RHS
- :[ = a^ + b^ + \sum_^m \left[ + right] a^b^k] by combining the sums
- :[ = a^ + b^ + \sum_^m a^b^k] from Pascal's rule
- :[ = \sum_^ a^b^k] by adding in the [ m+1] terms.
Trivia
- In the Sherlock Holmes books, the villain Professor Moriarty is the author of A Treatise on the Binomial Theorem.
- The binomial theorem is mentioned in the Gilbert and Sullivan song I am the Very Model of a Modern Major General.
- The binomial theorem appears in at least three different works by Monty Python - Coal Mine in Llandarogh Carmarthen, The Tale of Happy Valley, and The Meaning of Life.
See also
This article incorporates material from on PlanetMath, which is licensed under the [Text of the GNU Free Documentation LicenseGFDL].
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