Confluent hypergeometric function: Difference between revisions

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Line 171: :<math>M\left(a,b,\frac{x y}{x-1}\right) = (1-x)^a \cdot \sum_n\frac{a^{(n)}}{b^{(n)}}L_n^{(b-1)}(y)x^n</math> {{harv\|Erdélyi\|Magnus\|Oberhettinger\|Tricomi\|1953\|loc=6.12}} or :<math>~~\operatorname{~~M}\left( a;,\, b;,\, z \right) = \frac{\Gamma\left( 1 - a \right) \cdot \Gamma\left( b \right)}{\Gamma\left( b - a \right)} \cdot ~~\operatorname{~~L_{-a}^{(b - 1})}\left( z \right)</math>[https://functions.wolfram.com/HypergeometricFunctions/Hypergeometric1F1/27/01/0001/] ==Special cases== Line 227: and that this continued fraction converges uniformly to a [[meromorphic function]] of {{mvar\|z}} in every bounded ___domain that does not include a pole. ==See also== * [[Composite Bézier curve]] ==Notes== {{Reflist}}