Linear Algebra problem ... Topic: Matrix Notation and Algebra True or False? a.
ID: 3404855 • Letter: L
Question
Linear Algebra problem ... Topic: Matrix Notation and Algebra
True or False? a. If 3 vectors lie in the same plane, then there is a dependence relation between them. b. If a set of vectors is linearly dependent, then a vector in the set is a scalar multiple of one of the others. c. If a set of vectors is linearly dependent, then each vector in the set can be written as a linear combination of the others. d. If a set of vectors is linearly dependent, then there exists a vector in the set that can be written as a linear combination of the others. e. The columns of any 4 times 5 matrix are linearly dependent. f. A set of fewer than n vectors in R^n is linearly independent.Explanation / Answer
a) true
b) True
c) true
Let u, v and w be vectors, then
au +bv + cw = 0
since u,v,w are linearly dependent, so a,b and c are non zero, so
au= -bv - cw
u = (-b/a) v + ( -c/a)w
similary, we can show for v and w.
d) true
Let u, v and w be vectors, then
au +bv + cw = 0
since u,v,w are linearly dependent, so a,b and c are non zero, so
au= -bv - cw
u = (-b/a) v + ( -c/a)w
e) true
If A is 4x5 matrix, then rank A< min (4,5) =4
means A is singular matrix, so columns of A are linearly dependent.
f) false
since set A contains less than n elements, so
rank A < n that means A is singular. Therefore set A contains linearly dependent column elements.
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