For any vectors u, v and w, show that the vectors u-v, v-w and w-u form a linearly dependent set.

necessaryh

necessaryh

Answered question

2020-10-21

For any vectors u, v and w, show that the vectors u-v, v-w and w-u form a linearly dependent set.

Answer & Explanation

funblogC

funblogC

Skilled2020-10-22Added 91 answers

Given that the vectors u,v, and w. We are need to show that the vectors u-v, v-w, and w-u form a linearly dependent set. The set of vectors x1,x2xk is linearly dependent if c1x1+c2x2++ckxk=0
for some c1,c2, ckR where at least one of c1,c2ck is non zero.
Now, for any there scalars c1,c2 and c3 the linear combination of vectors u-v,v-w, and w-u can be written as
c1(uv)+c2(vw)+c3(wu)
Taking c1=c2=c3=1 we have c1(uv)+c2(vw)+c3(wu)=(uv)+(vw)+(wu)=0
Therefore, there is a combination of scalars c1=c2=c3=1=0 so that c1(uv)+c2(vw)+c3(wu)=0.
Hence, by the definition of linearly dependent set, the vectors u-v, v-w, and w-u form a linearly dependent set.

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