Show that intersection of two linearly independent sets is a linearly

1.	Show that intersection of two linearly independent sets is a linearly independent
Answer» ong>Answer: Origonal PROOF: i.e. x=(λa+μb)=y for a,b∈X∪Y and scalers λ and μ in the FIELD. If (λa+μb)=0, then we are done, for x≠0≠y. Then a and b are in a linearly INDEPENDENT set, so X∪Y is linearly independent. Hope it was helpful . MARK me as Brainliest.

Show that intersection of two linearly independent sets is a linearly independent

Answer»

ong>Answer:

Origonal PROOF:

i.e. x=(λa+μb)=y for a,b∈X∪Y and scalers λ and μ in the FIELD. If (λa+μb)=0, then we are done, for x≠0≠y. Then a and b are in a linearly INDEPENDENT set, so X∪Y is linearly independent.

Hope it was helpful . MARK me as Brainliest.

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Show that intersection of two linearly independent sets is a linearly independent

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