scipy.special.eval_chebyt¶
- scipy.special.eval_chebyt(n, x, out=None) = <ufunc 'eval_chebyt'>¶
Evaluate Chebyshev polynomial of the first kind at a point.
The Chebyshev polynomials of the first kind can be defined via the Gauss hypergeometric function \({}_2F_1\) as
\[T_n(x) = {}_2F_1(n, -n; 1/2; (1 - x)/2).\]When \(n\) is an integer the result is a polynomial of degree \(n\).
Parameters: n : array_like
Degree of the polynomial. If not an integer, the result is determined via the relation to the Gauss hypergeometric function.
x : array_like
Points at which to evaluate the Chebyshev polynomial
Returns: T : ndarray
Values of the Chebyshev polynomial
See also
- roots_chebyt
- roots and quadrature weights of Chebyshev polynomials of the first kind
- chebyu
- Chebychev polynomial object
- eval_chebyu
- evaluate Chebyshev polynomials of the second kind
- hyp2f1
- Gauss hypergeometric function
- numpy.polynomial.chebyshev.Chebyshev
- Chebyshev series
Notes
This routine is numerically stable for x in [-1, 1] at least up to order 10000.