Answer to Question #339354 in Linear Algebra for rahul

Recall the definition of the vector space:

A vector space over "\\mathbb{C}" is a set "V" with operations of addition:"V\\times V\\rightarrow V" and scalar multiplication: "{\\mathbb{C}}\\times V\\rightarrow V" satisfying the following properties:

1. Commutativity: "f+g=g+f" for all "f,g\\in V".
2. Associativity: "(f+g)+h=f+(g+h)" for all "f,g,h\\in V".
3. Additive identity: there exists "0\\in V": "0+f=f" for all "f\\in V".
4. Additive inverse: For every "f\\in V" there exists "g\\in V" satisfying: "f+g=0".
5. Multiplicative identity: there is "1f=f" for all "f\\in V".
6. Distributivity: "a(f+g)=af+ag" and "(a+b)f=af+bf" for all "a,b\\in{\\mathbb{C}}" and all "f\\in V".

We will check the properties for "V(S)". Properties "1" and "2" are satisfied due to the properties of standard addition and definition: "(f+g)(x)=f(x)+g(x)". Consider zero function . It satisfies property "3". For any function "f(x)" consider the function "g(x)=-f(x)". It satisfies property "4" . Properties "5" and "6" are satisfied due to the definition "(\\alpha\\cdot f)(x)=\\alpha f(x)" and properties of standard multiplication.