Vector Spaces: Why Functions Passing Through The Origin Are Not Necessarily Zero Vectors In F (-Infinity, Infinity)

In the vector space F (−infinity, infinity) any function whose graph passesthrough the origin is a zero vector

0

This is false.

Firstly, the vector space F (-infinity, infinity) consists of all real-valued functions that are defined on the interval (-infinity, infinity). A function is considered a vector in this space, and these vectors can be added and scaled just like ordinary vectors in Euclidean space.

Next, a zero vector in this space is a function that, when added to any other function in the space, results in the original function. In other words, it is a function f(x) that satisfies the equation:

f(x) + g(x) = g(x)

for all functions g(x) in the vector space.

Now, consider the function f(x) = 0. This function passes through the origin, since f(0) = 0. However, it is not a zero vector in the vector space because it does not satisfy the equation above. For example, if we choose g(x) = x, then:

f(x) + g(x) = 0 + x = x

which is not equal to g(x).

Therefore, any function that passes through the origin is not necessarily a zero vector in the vector space F (-infinity, infinity).

More Answers:
Proving Every Subset Containing Zero Vector Is A Subspace Of A Vector Space V.
Subspaces In Vector Spaces: Why Every Vector Space Is A Subspace Of Itself.
Proving That Every Subspace Of A Vector Space Is A Vector Space: A Step-By-Step Guide

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