New interpolatory quadrature formulae with Chebyshev abscissae (Q1298801)

Interpolatory quadrature formulae, relative to the Legendre weight function on \([-1,1]\), are studied. The formulae have as nodes the zeros of any one of the four Chebyshev polynomials of degree \(n\) plus one of the points \(1\) or \(-1\). Explicit formulae for the weights are derived and the convergence for Riemann integrable functions on \([-1,1]\) are established, as well as for functions having a monotonic singularity at \(-1\) or \(1\).