 OrthogonalSeries - Maple Help

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Overview of the OrthogonalSeries Package Calling Sequence OrthogonalSeries[command](arguments) command(arguments) Description

 • The OrthogonalSeries package contains commands to manipulate series of classical orthogonal polynomials or, more generally, hypergeometric polynomials.
 • Each command in the OrthogonalSeries package can be accessed by using either the long form or the short form of the command name in the command calling sequence.
 As the underlying implementation of the OrthogonalSeries package is a module, it is also possible to use the form OrthogonalSeries:-command to access a command from the package. For more information, see Module Members. List of OrthogonalSeries Package Commands

 The following is a list of available commands.

 To display the help page for a particular OrthogonalSeries commands, see Getting Help with a Command in a Package. Examples

 > $\mathrm{with}\left(\mathrm{OrthogonalSeries}\right):$
 > $\mathrm{Create}\left(u\left(n\right),\mathrm{HermiteH}\left(n,x\right)\right)$
 ${\sum }_{{n}{=}{0}}^{{\mathrm{\infty }}}{}{u}{}\left({n}\right){}{\mathrm{HermiteH}}{}\left({n}{,}{x}\right)$ (1)
 > $C≔\mathrm{ChangeBasis}\left(1+3y{x}^{2}+{y}^{3}x,\mathrm{ChebyshevT}\left(n,x\right),\mathrm{ChebyshevU}\left(m,y\right)\right)$
 ${C}{≔}{\mathrm{ChebyshevT}}{}\left({0}{,}{x}\right){}{\mathrm{ChebyshevU}}{}\left({0}{,}{y}\right){+}\frac{{3}{}{\mathrm{ChebyshevT}}{}\left({0}{,}{x}\right){}{\mathrm{ChebyshevU}}{}\left({1}{,}{y}\right)}{{4}}{+}\frac{{\mathrm{ChebyshevT}}{}\left({1}{,}{x}\right){}{\mathrm{ChebyshevU}}{}\left({1}{,}{y}\right)}{{2}}{+}\frac{{3}{}{\mathrm{ChebyshevT}}{}\left({2}{,}{x}\right){}{\mathrm{ChebyshevU}}{}\left({1}{,}{y}\right)}{{4}}$ (2)
 > $\mathrm{Evaluate}\left(C\right)$
 ${3}{}{{x}}^{{2}}{}{y}{+}{y}{}{x}{+}{1}$ (3)