If B is the standard basis of the space P3 of polynomials, then let B= {1, t, t, t}. Use coordinate vectors to test the linear independence of the set of polynomialsbelow. Explain your work.(1 – t)³, (– 2 – t)?, 3 + 7t – 21² + t3Write the coordinate vector for the polynomial (1- t)°, denoted p,-P1 =|%3D

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Answered: If B is the standard basis of the space…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Let B be the standard basis of the space P₂ of polynomials. Use coordinate vectors to test whether the following set of polynomials span P2. Justify your conclusion. - 5t+t², 1+5t-t²2, 2+t+t², +8t-3t² G Does the set of polynomials span P₂? O A. Yes; since the matrix whose columns are the B-coordinate vectors of each polynomial has a pivot position in each row, the set of coordinate vectors spans R². By isomorphism between R² and P2, the set of polynomials spans P2. O B. No; since the matrix whose columns are the B-coordinate vectors of each polynomial does not have a pivot position in each row, the set of coordinate vectors does not span R³. By isomorphism between R³ and P2, the set of polynomials does not span P2. OC. No; since the matrix whose columns are the B-coordinate vectors of each polynomial does not have a pivot position in each row, the set of coordinate vectors does not span R². By isomorphism between R² and P2, the set of polynomials does not span P2. ⒸD. Yes; since the…
Describe the zero vector of the vector space. R5 Describe the additive inverse of a vector, (v1, v2, v3, v4, v5), in the vector space.
Find the image of the vector = (1, 2) by rotating it 30° counter-clockwise and scaling it by a factor of 4. Select all answers that are correct. O 2sqrt(3)-4 is the first component O 2+4sqrt(3) is the second component O 2sqrt(3)-4 is the second component O 2+4sqrt(3) is the first component none of these above
Let u = (1, 2, 3), v = (2, 2, –1), and w = (3, 0, -3). Find 2u + 4v – w. STEP 1: Multiply each vector by a scalar. 2u = 4v = -W = STEP 2:Add the results from Step 1. 2u + 4v – w =
Calculate the scalar triple product u - (v x w), where u = (7,7,0), v = {-3, –9,7), and w = (7, –9, 1). (Use symbolic notation and fractions where needed.) u . (v x w) =
a. Write the vector (-4,-8, 6) as a linear combination of a₁ (1, -3, -2), a₂ = (-5,–2,5) and ẩ3 = (−1,2,3). Express your answer in terms of the named vectors. Your answer should be in the form 4ả₁ + 5ả₂ + 6ẩ3, which would be entered as 4a1 + 5a2 + 6a3. (-4,-8, 6) = -3a1+a2+2a3 b. Represent the vector (-4,-8,6) in terms of the ordered basis = {(1, −3,−2), (-5, -2,5),(-1,2,3)}. Your answer should be a vector of the general form . [(-4,-8,6)] =

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