Polynomial identities involving Pascal's triangle rows
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Updated
May 21, 2022 - TeX
Polynomial identities involving Pascal's triangle rows
Probability with python - combinations, permutations, sets
Differentiation is process of finding the derivative, or rate of change, of a function. Derivative itself is defined by the limit of function's change divided by the function's argument change as change tends to zero. In particular, for polynomials the function's change is calculated via Binomial expansion.
In this manuscript, we show new binomial identities in iterated rascal triangles, revealing a connection between the Vandermonde convolution and iterated rascal numbers. We also present Vandermonde-like binomial identities. Furthermore, we establish a relation between iterated rascal triangle and (1,q)-binomial coefficients.
On the link between binomial theorem and discrete convolution
Pharmaceutical company Sun Pharma
Polynomial identity involving Binomial Theorem and Faulhaber's formula
Open research project on polynomial interpolation and approximation
A command line tool to expand expressions using the binomial expansion formula, written in python
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