Let P11 be set of polynomials with degree <= 11, let S be its subspace of p11 givin a polynomial function f so that f(11)=f(10)=f(12), what is the dimension of S ?

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- Nov 29th 2012, 04:29 AMice_syncerTough linear algebra question
Let P11 be set of polynomials with degree <= 11, let S be its subspace of p11 givin a polynomial function f so that f(11)=f(10)=f(12), what is the dimension of S ?

- Nov 29th 2012, 02:51 PMModusPonensRe: Tough linear algebra question
Your question is not well formulated.

- Nov 30th 2012, 04:18 PMice_syncerRe: Tough linear algebra question
Sorry, let me rewrite the question exactly as it was given in my question paper :

"Let P(subscript 11) denote the set of all polynomials of degree < = 11. Let S denote the subspace of all polynomials , f , in P(subscript 11) satisfying f(10)=f(11)=f(12). Compute the dimension of S, giving clear explanation."