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Vectors & Spacesmedium
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Given the inner product space P1P_1P1​ (polynomials of degree ≤1\leq 1≤1) with the inner product ⟨p,q⟩=∫01p(x)q(x) dx\langle p, q \rangle = \int_0^1 p(x)q(x)\,dx⟨p,q⟩=∫01​p(x)q(x)dx, find the norm of p(x)=xp(x) = xp(x)=x.