Prove that in a real vector space V*c('\alpha-\beta)=c*\alpha-c*\beta where c \in

shangokm

shangokm

Answered question

2022-01-24

Prove that in a real vector space Vc(αβ)=cαcβwhere cR;α,βV?

Answer & Explanation

saennwegoyk

saennwegoyk

Beginner2022-01-25Added 7 answers

See the explanation below
Explanation:
The 2 operations allowed in a vector space are addition and scalar multiplication. They are called the standard operations on V
uV,vV, this is called the additive inverse of u
Here, we have
α,βV and cR
Removing the parenthesis
c(αβ)=c(α+(β))=cα+c(β)
=cαcβ

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