Picture behind $SO(3)/SO(2)\simeq S^2$
Solution 1:
(To remove this question from the unanswered list):
Think of group action. $SO(3)$ acts on $\mathbb S^2$, and $SO(2)$ is a stabilizer (any $SO(3)$ element fixing $(0,0,1)$ must be the rotation of the $x,y$ plane)
Solution 2:
A quite intuitive way to understand that the coset space $SO(3)/SO(2)$ is indeed the sphere $S^2$ consists in finding the manifold $SO(3)$ and then identifying the points connected by rotations in a plane.
First the $SO(3)$ manifold. The oriented segment from the origin to a given point belonging to the manifold gives the oriented axis of rotation, $\hat n$, while the distance to the origin gives the angle, $\phi$. We adopt the right-hand rule thus a rotation $(\phi,\hat n)$ is equivalent to a rotation $(-\phi,-\hat n)$ and the union $(0\leq\phi\leq\pi,\hat n)\cup(0\leq\phi\leq\pi,-\hat n)$ gives all possible rotations about the axis $n$. Moreover, the rotation $(\pi, \hat n)$ is identified to the rotation $(\pi,-\hat n)$. Thus we find that the $SO(3)$ manifold is a ball of radius $\pi$ whose antipodal points on its surface are are identified.
Now chose a point of that manifold, namely a point in the surface. This singles out an oriented axis $\hat n$ and then we identify all points in that axis since they are related by rotations in the plane perpendicular to the axis, i.e., elements of $SO(2)$. Repeat this to all different axis and we are let with a sphere $S^2$.