A set of two, three, or four red vectors in R² or R³ is shown in each picture below. Determine whether each set of vectors is a basis (forthe appropriate subspace, R? or R³). Note: For the pictures in R³, a grid is drawn in the xy-plane, and vectors with their tip on the gridare in the æy-plane, while vectors with their tip not on the grid are not in the æy-plane.choosechoosechoosechoosebasischoose

Answered: Image /qna-images/answer/0d47db1f-8612-4679-b673-7f4a0c62a355.jpg

Answered: A set of two, three, or four red…

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 v = (v1, v2, ..., vn) and û = (u₁, U2, ..., Un) are a pair of n-dimensional vectors. Assume that each component of the vector is a real number, so 7 and u are both members of the set R¹. We will say that and u are "almost the same" when every component of is close to every component of ū. That is, v₁ is close to u₁, v2 is close to u2, etc (practically speaking, "close" means that their absolute difference is small). Assume that we are given the predefined predicate CloseTo(x, y) and the integer constant n. Use them to write a formal definition of the new predicate Almost The Same (7, u) which asserts that n dimensional vector is almost the same as ū. Tip: It is not legal to say i v to refer to a component of v, because is not a set. Instead, use vi to refer to the ith component of v. What set would i belong to in this case?
Find a real number k such that the following three vectors in R4 are not linearly independent. (1, 0, –3, 2)", (4, 2, 4, 1)", (18, 10, k, 1)"
Of the five vectors below: ст со со ст which ones will form a basis for the subspace spanned by all the five vectors? O The first and the fourth vector. 833 O O The first three vectors. O The first and the third vecto O The first and the second vector. O The first, third and the last vector. O The first vector. (
Find a basis of the subspace of R5 spanned by the following vectors: 4 1 -1 8 6 6 -2 2 12 16 -1 -2 2 -2 2 5 3 -2 10 4 5 3 -2 10 4

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