MATH136 Lecture Notes - Lecture 2: Linear Combination, International Sport Karate Association, Linear Independence

True/False: Explain why the statement is true, or give a specific counter-example: The span of {0-} is {0-}. It v- , w- are both vectors in R2 that are non-zero and are not parallel to each other then Span[ { v-, w-} ] is all of R2. If v-, w- are both vectors in R2 that arc non-zero and one is a scalar multiple of the other then Span[ {v-, w-} ] is the same as Span[ { v- }] . If v- belongs to the span of set of vectors S, then so does for every scalar c. Any set of vectors S containing the zero vector must be linearly independent. The Zero vector is in the span of any non-empty set of vectors S If a subset of R4 contains more than 4 vectors and is linearly dependent There is a subset of P4 that contains more than 4 vectors and is linearly independent If Span[ ] , then there is a nontrivial solution to the equation

Explain why the statement is true, or give a specific counter-example: The span of {0} is {0}. It v, w are both vectors in R2 that are non-zero and are not parallel to each other, then Span[ {v, w) ] is all of R2 . It v, w are both vectors in R2 that are non-zero and one is a scalar multiple of the other, then Span[ {v, w} ] is the same as Span[ {v} ] . If v belongs to the span of set of vectors S, then so does cv for every scalar c. Any set of vectors S containing the zero vector 0 must he linearly independent. The zero vector 0 is in the span of any non-empty set of vectors S. If a subset of R4 contains more than 4 vectors, then it must be linearly dependent. There is a subset of p4 that contains more than 4 vectors and is linearly independent. If v Span . then there is a nontrivial solution to the equation

Linear independence Show that the vectors are linearly independent. To do this, rewrite the vector equation klvl+k2v2 + --+knvn = 0 as Ak = 0, where A consists of v1? v2, and v3 as column vectors and k is the coefficients vector, and solve for k.