(a) Use the Recurrent relation for generating the Chebyshev polynomials which is given by To(x) = 1, T1(x) = x, Tn 1(x) = 2xTn(x) –Tn-1(x) to approximate the function with a Maclaurin’s polynomial of

(a) Use the Recurrent relation for generating the Chebyshev polynomials which is given by To(x) = 1, T1(x) = x, Tn 1(x) = 2xTn(x) –Tn-1(x) to approximate the function with a Maclaurin’s polynomial of order 5. Hence use the Chebyshev polynomials and method of economization to obtain a lesser degree polynomial of approximation, of order 3.

(b) Determine the upper error bound, due to the economization.

(c) Compare and contrast with results obtained using Legendre’s orthogonal polynomials.