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- ...a [[sequence]] which is of interest. Therefore the power series (i.e. the generating function) is <math>c_0 + c_1 x + c_2 x^2 + \cdots </math> and the sequence Many generating functions can be derived using the [[Geometric sequence#Infinite|sum formul4 KB (659 words) - 11:54, 7 March 2022
- #REDIRECT [[Generating function]]33 bytes (3 words) - 11:35, 6 July 2007
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- ...s competitions and can be approached by a variety of techniques, such as [[generating functions]] or the [[Principle of Inclusion-Exclusion|principle of inclusio1 KB (208 words) - 01:12, 4 October 2020
- * [[Generating function]]4 KB (615 words) - 10:43, 21 May 2021
- ...k Tiefenbruck]] and is supported by the [[San Diego Math Circle]]. [[user:generating | Andy Niedermaier]] was a coach for 2007-2009, and [[user:MCrawford | Math2 KB (378 words) - 15:34, 5 January 2010
- ...a [[sequence]] which is of interest. Therefore the power series (i.e. the generating function) is <math>c_0 + c_1 x + c_2 x^2 + \cdots </math> and the sequence Many generating functions can be derived using the [[Geometric sequence#Infinite|sum formul4 KB (659 words) - 11:54, 7 March 2022
- ...function are termwise equal, the series at <math>x = a + b</math> is the [[Generating function#Convolutions|convolution]] of the series at <math>x = a</math> and5 KB (935 words) - 12:11, 20 February 2024
- The [[Sieve of Eratosthenes]] is a relatively simplistic [[algorithm]] for generating a list of the first few prime numbers. It is a method in which the multiple The Sieve of Sundaram is a relatively simplistic [[algorithm]] for generating all odd prime numbers, less than <math>2n+2</math>. It is a method by which6 KB (1,036 words) - 17:26, 2 September 2024
- ..._i=C_{i-1}+4i</math>, and note that <math>C_0=1</math>. Now we can create generating functions. <math>F(x)=\sum_{i=0}^\infty C_ix^i</math>. Also, <math>G(x)=\7 KB (1,276 words) - 19:51, 6 January 2024
- Alternatively, we can use a [[generating function]] to solve this problem. The goal is to find the generating function for the number of unique terms in the simplified expression (in te8 KB (1,332 words) - 16:37, 17 September 2023
- * [[Generating functions]]910 bytes (77 words) - 15:23, 18 May 2021
- == Solution 6 (Generating Functions and Roots of Unity Filter / Casework) == .../math> states, <math>n</math> steps) is <math>(x+x^2+x^3)^n</math>, so the generating function of interest for this problem is <math>(x+x^2+x^3)^7</math>. Our go19 KB (3,128 words) - 20:38, 23 July 2024
- ...th> can be equal with some value of <math>x</math>). MAA is pretty good at generating smooth combinations, so in this case, the AM-GM works; however, always try4 KB (703 words) - 22:13, 30 August 2024
- Define the generating function <math>C_2(X)</math> as Define the generating function <math>C_1(X)</math> as5 KB (923 words) - 12:17, 16 September 2024
- == Solution 2 (Generating Functions)==3 KB (515 words) - 03:29, 27 November 2023
- ...for each of the terms, and obtain <math>(x+x^3+x^5\cdots)^4</math> as the generating function for the sum of the <math>4</math> numbers. We seek the <math>x^{985 KB (684 words) - 17:52, 19 June 2024
- ===Solution 6 (generating functions)=== The generating function for this is <math>(x+x^2)</math> since an ant on any vertex of the15 KB (2,406 words) - 22:56, 23 November 2023
- ...+1}</math>, <math>M\geq 0</math> be the length of the longest jump made in generating <math>J_{i_0,k_0}</math>. Such a jump can only be made from a number that i7 KB (1,280 words) - 16:23, 26 March 2016
- == Generating Subset == ...ubset is said to be ''minimal'' if on removing any element it ceases to be generating.3 KB (561 words) - 23:47, 20 March 2009
- * [[Generating functions]]705 bytes (64 words) - 15:22, 18 May 2021
- We use [[generating function]]s to represent the sum of the two dice rolls: <center><math>(x+x^1 KB (210 words) - 00:30, 3 January 2023
- ...n if two squares in the row are shaded, then the row is represented by the generating function <math>ab+ac+ad+bc+bd+cd</math>, which we can write as <math>P(a,b,13 KB (2,328 words) - 23:12, 28 November 2023
