This is a problem in 'Topology and Geometry' by Bredon. I tried hard on this problem, but have no idea what to do. This question was onced asked by someone, but there was no satisfactory answer.
Let $\mathbb{K}^2$ be Klein bottle. The problem asks us to show that $\pi_1 (\mathbb{K}^2 )$ is generated by two elements, say $\alpha$ and $\beta$ obtained from the "longitudinal" and "latitudinal" loops.
The problem is that this problem is given just after defining and proving some elementary facts about fundamental groups. No exact computation of fundamental groups is done until here. Even the fundamental group of the circle. Many useful tools such as covering spaces, path lifting, van Kampen Theorem, properly discontinuous actions are not introduced yet.
However, since this book presents some theory on differentiable manifolds before the fundamental group, we can use some facts about differential manifolds. For example, we have the Smooth Approximation Theorem and Sard's Theorem.
Also, there's a hint given in the book: Hint: Use the fact that a smooth loop must miss a point.