Problem: Let $V$ be a finite dimensional vector space and $v \in V$ be a nonzero vector. Let $V^{\ast} $ denotes the dual space of $V$ Prove that there exist $\phi \in V^{\ast} $ such that $\phi (v) = 1$.
Solution: I encourage you to attempt to solve the problem today. The solution will be provided tomorrow. This will give you the opportunity to test your understanding of the problem and to improve your skills in solving similar problems in the future.