Which of the following are true statements? If {y, z} is linearly dependent, then {x, y, z} is 'linearly dependent for any X. Every set containing a spanning set is again a spanning set. If {x, y, z} is linearly independent, then {y, z} is linearly independent. If all of X1, X2,..., Xk are nonzero, then {X1, X2,...,xk} is linearly independent. If {x, y} is linearly independent, then {x, y, x+y} is linearly independent. If one of X1, X2,..., x is 0, then {x, y, z} is linearly dependent. If {x, y, z} is linearly independent, then ax+by+cz = 0 for some a, b and c in R.
Which of the following are true statements? If {y, z} is linearly dependent, then {x, y, z} is 'linearly dependent for any X. Every set containing a spanning set is again a spanning set. If {x, y, z} is linearly independent, then {y, z} is linearly independent. If all of X1, X2,..., Xk are nonzero, then {X1, X2,...,xk} is linearly independent. If {x, y} is linearly independent, then {x, y, x+y} is linearly independent. If one of X1, X2,..., x is 0, then {x, y, z} is linearly dependent. If {x, y, z} is linearly independent, then ax+by+cz = 0 for some a, b and c in R.
Linear Algebra: A Modern Introduction
4th Edition
ISBN:9781285463247
Author:David Poole
Publisher:David Poole
Chapter3: Matrices
Section3.7: Applications
Problem 74EQ
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![Which of the following are true statements?
If {y, z} is linearly dependent, then {x, y, z} is 'linearly dependent for any X.
Every set containing a spanning set is again a spanning set.
If {x, y, z} is linearly independent, then {y, z} is linearly independent.
If all of X1, X2,..., Xk are nonzero, then {X1, X2,...,xk} is linearly independent.
If {x, y} is linearly independent, then {x, y, x+y} is linearly independent.
If one of X1, X2,..., x is 0, then {x, y, z} is linearly dependent. If {x, y, z} is linearly
independent, then ax+by+cz = 0 for some a, b and c in R.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Ff831f8cf-6781-405a-9919-cc1cc8ad3122%2Ffd9577e9-641b-4451-af2a-8164475c5720%2Fomosnqj_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Which of the following are true statements?
If {y, z} is linearly dependent, then {x, y, z} is 'linearly dependent for any X.
Every set containing a spanning set is again a spanning set.
If {x, y, z} is linearly independent, then {y, z} is linearly independent.
If all of X1, X2,..., Xk are nonzero, then {X1, X2,...,xk} is linearly independent.
If {x, y} is linearly independent, then {x, y, x+y} is linearly independent.
If one of X1, X2,..., x is 0, then {x, y, z} is linearly dependent. If {x, y, z} is linearly
independent, then ax+by+cz = 0 for some a, b and c in R.
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