Calculus In Exercises 43-48, let B = { 1 , x , x 2 } be a basis for P 2 with the inner product 〈 p , q 〉 = ∫ - 1 1 p ( x ) q ( x ) d x . Complete Example 9 by verifying the inner products. 〈 x , 1 〉 = 0
Calculus In Exercises 43-48, let B = { 1 , x , x 2 } be a basis for P 2 with the inner product 〈 p , q 〉 = ∫ - 1 1 p ( x ) q ( x ) d x . Complete Example 9 by verifying the inner products. 〈 x , 1 〉 = 0
Solution Summary: The author explains the formula for the inner product langle x,1rangle =0.
Using linear algebra, show that G={p1(x)=1−x+x^2, p2(x)=x, p3(x)=x+x^2} is a basis of P2, the vector space of polynomials of degree at most two with real coefficients.
b) Find the value of k such that (-1,1,1), (1,1,1), (1, -1, k) form a basis of R²
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