Answer to Question #257793 in Linear Algebra for Tege

Question #257793

Let V be the set R⁺of positive real number and define V₁ "\\bigoplus" V₂=V₁V₂ and "\\delta" "\\bigodot" V₁=V₁"\\delta" for all V₁V₂"\\epsilon" V and "\\delta" "\\epsilon" R. Then show that v is a vector space over R

Expert's answer

A vector space over "\\R" consist of a set "V" on which is defined of addition associated to elements "v_1\\>and\\>v_2\\>of\\>V,\\>" "an \\> element \\>u\\>and\\>v\\>of \\>V"

And an operation of multiplication by scalars,associated to each element "\\delta" of "\\R" and to each element "v\\>of\\>V"

an element "\\delta\\>v\\>of\\>V"

"V" satisfies the following axioms

"1.\\>v_1+v_2=v_2+v_1"

"2.\\>(v_1+v_2)+v_3=v_1+(v_2+v_3)"

"3." There exists a 0 element"\\>0\\>of\\>V" such that"\\>v+0=v"

"4." Given any element "v\\>of\\>V" there exists "\\>-v\\>of\\>V" with the property that

"v+(-v)=0"

"5." "(\\delta _1+\\delta_2)v=\\delta_1v+\\delta_2v"

"6. \\>\\delta(v_1+v_2)=\\delta\\>v_1+\\delta\\>v_2"

"7.\\>\\delta_1(\\delta_2v)=(\\delta_1\\delta_2)v"

"8.\\>Iv=v"

Where "I" is the multiplicative identity element of "\\R"

Therefore "V" is a vector space over "\\R"

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Answer to Question #257793 in Linear Algebra for Tege

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