Please attempt all questions. 2. Use the polynomial inner product to find the projection of f(*)...
Please attempt both questions
3. Use the continuous function on the interval (0,1) inner product to find the projection of f(x) onto g(x). (Feel free to use an integral calculator. I use wolfram alpha. Just make sure to type the problem in carefully). (a) f(x) = -22 - 1, g(x) = -2 (b) f(x) = 2r?, g(x) = 2+1 (e) f(x)=-1-1, g(x) = x2 +3 4. Consider 3-space with the dot product. Your subspace S will be the plane z...
Consider 3-space with the dot product. Your subspace S will be the plane z = 0 with orthogonal basis is {}} (a) Confirm that the given basis for z = 0 is orthogonal. (b) Algebraically find the projection of ū = -101 onto z = 0. (c) Plot ū , both basis elements of S, the projection of ū onto each basis element, and projs ū (That is 5 vectors total). z х
Use the continuous function on the interval [0, 1] inner product to find the projection of f(x) onto g(x). (Feel free to use an integral calculator. I use wolfram alpha. Just make sure to type the problem in carefully). (a) f(x) = -x2 – 1, g(x) = x2 (b) f(x) = 2x2, g(x) = x + 1 (c) f(x) = -x – 1, g(x) = x2 + 3
(3 points) The function (f, g) = f(-2x(-2) + f(0)g(0) + f(2)g(2) defines an inner product on P2. With respect to this inner product, find the orthogonal projection of /)-4x2 +5x-3 onto the subspace L spanned by g(x) = 2x2-2x-4.
Use the polynomial inner product to find the projection of f(x) onto g(x). (a) f(x) = – x2 - 1, g(x) = x2 (b) f(x) = 2x2, g(x) = x + 1 (c) f(x) = -x -1, g(x) = x2 + 3
please provide step by step solution
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(1 point) Use the inner product (5,8) = $* f()g(x) dx in the vector space P(R) of polynomials to find the orthogonal projection of f(x) = 2x2 + 4 onto the subspace V spanned by g(x) = x and h(x) = 1. (Caution: x and 1 do not form an orthogonal basis of V.) projy(f) =
(1 point) Use the inner product 1 0 <fig >= f(x)g(x)dx in the vector space Cº[0, 1] to find the orthogonal projection of f(x) = 6x2 + 1 onto the subspace V spanned by g(x) = x – į and h(x) = 1. projy(f) =
(1 point) Use the inner product <p.q >= P(-3)(-3) + p(0)q(0) + p(2)q(2) in Pg to find the orthogonal projection of p(x) = 2x2 + 6x + 4 onto the line L spanned by 9(x) = 3x2 - 4x - 6. proj. (p) =
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(2)()dz in the vector space Cº|0, 1] to find the orthogonal projection of f(a) – 332 – 1 onto the subspaco V (1 point) Use the inner product < 1.9 > spanned by g(x) - and h(x) - 1 proj) (1 point) Find the orthogonal projection of -1 -5 V = 9 -11 onto the subspace V of R4 spanned by -4 -2 -4 -5 X1 = and X2 == 1 -28 -4 0 -32276/5641 -2789775641 projv...
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(1 point) Use the inner product < p, 2 >= P(-2)(-2) + p(0)q(0) + p(3)q(3) in P3 to find the orthogonal projection of p(x) = 3x2 + 6x – 8 onto the line L spanned by q(x) = = 2x2 – 3x – 9. projų (p) =