Suppose $V$ is a vector space over an infinte field $F$. Assume that $n<\infty$ and $W_i$ $(1<i<n \land i ,n\in\Bbb N)$ are proper subspaces of $V$.$(W_i\neq V \land W_i\neq \emptyset)$
Prove that we can't represent $V$ this way:
$V=\cup_1^n W_i=W_1\cup W_2\cup...\cup W_n$
I am spending my first course in linear algebra so i am not familiar with common concepts such as dimension or basis or... I am just starting this course and I only understand concepts like vector spaces or subspaces or fields or... please help me to solve this problem
thank you...
