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q-Sine

The q-Analog of the Sine function, as advocated by R. W. Gosper, is defined by

\begin{displaymath}
\sin_q(z,q)={\vartheta_1(z,p)\over\vartheta_1({\textstyle{1\over 2}}\pi, p)},
\end{displaymath}

where $\vartheta_1(z,p)$ is a Theta Function and $p$ is defined via

\begin{displaymath}
(\ln p)(\ln q)=\pi^2.
\end{displaymath}

This is a period $2\pi$, Odd Function of unit amplitude with double and triple angle formulas and addition formulas which are analogous to ordinary Sine and Cosine. For example,

\begin{displaymath}
\sin_q(2z,q)=(q+1){\pi_q\over p_{q^2}}\cos_q(z,q^2)\sin_q(z,q^2),
\end{displaymath}

where $\cos_q(z,a)$ is the q-Cosine, and $\pi_q$ is q-Pi.

See also q-Cosine, q-Factorial


References

Gosper, R. W. ``Experiments and Discoveries in $q$-Trigonometry.'' Unpublished manuscript.




© 1996-9 Eric W. Weisstein
1999-05-25