Proving Completeness of Continuous Basis Vectors

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Homework Statement


Consider the vector space that consists of all possible linear combinations of the following functions: $$1, sin (x), cos (x), (sin (x))^{2}, (cos x)^{2}, sin (2x), cos (2x)$$ What is the dimension of this space? Exhibit a possible set of basis vectors, and demonstrate that it is complete.

Homework Equations


$$\sum_{n} |\phi_{n}\rangle \langle \phi_{n}| = 1 $$

The Attempt at a Solution



What is the dimension of this space?[/B]
By simple trigonometric relations, I found [itex]{{1, (cos (x))^{2}, sin (x), cos (x), sin (2x)}}[/itex] spam the space. Therefore, [itex]dim = 5[/itex].

I am not sure about how to proceed from here.
Aren't the basis [itex]{{1, (cos (x))^{2}, sin (x), cos (x), sin (2x)}}[/itex]?
How to demonstrate completeness of continuous bases?

Thank you
 
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