A Simple Proof for a Theorem of Kelisky and Rivlin

Theorem (Kelisky and Rivlin) Let f(x) be a function defined in [0,1] and B_n(f(x))=sum from k=o to n (f(k/s)(?)x~k(1-x)~(n-k)) be the nth Bernstein polynomial of f(x). Then lim B~l(f(x))=f(0)+(f(1)-f(0))x. Proof We can assume f(0)=0, Let φ_i(x) and ψ_i(x)(i=1,2,…,n) be Bernstein basis polynomials and Bezier basis polynomials respectively. Let n×n matrices