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1-point-let-p2-be-the-vector-space-of-all-polynomials-of-degree-2-or-less-and-let-h-be-the-s-pa797

(1 point) Let $P_{2}$ be the vector space of all polynomials of degree 2 or less, and let $H$ be the subspace spanned by $26x_{2}+15x+32,?(7x_{2}+4x+10)$, and $12x_{2}+7x+15$. a. The dimension of the subspace $H$ is b. Is ${26x_{2}+15x+32,?(7x_{2}+4x+10),12x_{2}+7x+15}$ a basis for $P_{2}$ ? Be sure you can explain and justify your answer. c. A basis for the subspace $H$ is \{ \}. Enter a polynomial or a comma separated list of polynomials.

Explanation:P2 is the vector space of polynomial of degree 2 or less ..and H is the subspace of P2 ...