Solve a linear system to determine whether thegiven vectorsu, v, and w are linearly independentor dependent. If they are linearly dependent, findscalars a, b, and c not all zero suchthat au+by+ cw =0.Du, v, and w areu="-[:]A) The vectorsORB) The vectors U, V,wherea=the value ofc is(please simplify your answer).and wb=are·8W=-B 3linearly independentlinearly dependent,whereand C = 1₁choosen to be equal to 1.

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Answered: Solve a linear system to determine…

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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• Suppose that a, b and are vectors which satisfy the following equation: 5a - 3x = x+b Solve this equation for 7. • If a, b and I are vectors which satisfy the equation in the first part and additionally: a = (1, 0, 4, 1), b = (-2,0, 1, 1) then what is I? • a and bare i are vectors which satisfy the equation in the first part and additionally: a = cos(x), b = x² +1 then what is £?
• Suppose that a, b and are vectors which satisfy the following equation: 5a - 3x = x +b Solve this equation for 7. • If a, b and I are vectors which satisfy the equation in the first part and additionally: a = (1,0, 4, 1), b = (-2,0, 1, 1) then what is I? • a and bare are vectors which satisfy the equation in the first part and additionally: a = cos(x), b = x² +1 then what is £?
Which equations below represent the line in R³ that passes through the point (-3,5,-5) and is parallel to the vector 3i + 4j + 6k? You may select more than one equation. Or(t): +t OF(t) = + t Ox=3+3t; y = 5 + 4t; z = = 5 + 6t - OF(t): = -3, 5, -5> +t OF(t) = +t 1 - x=3+ 6t; y = 5 + 8t; z = 5+ 6t OF(t)= +t OF(t)= + t -
Determine if b is a linear combination of the other vectors. If so, express b as a linear combination. (If b cannot be written as a linear combination of the other two vectors, enter DNE in both answer blanks.) a = a, = b = Jas + ( 2 b =
PLEASE do both. I will give thumbs up!!! PLEASE.

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