The correct relation between linear velocity \(\mathop \upsilon \limits^ \to \) and angular velocity \(\,\mathop \omega \limits^ \to \) of a particle is
1
\(\mathop \upsilon \limits^ \to = \mathop \omega \limits^ \to \, \times \mathop r\limits^ \to \,\,\)
2
\(\mathop \omega \limits^ \to \, = \,\mathop \upsilon \limits^ \to \, \times \,\mathop r\limits^ \to \,\)
3
\(\mathop \omega \limits^ \to \, = \,\mathop r\limits^ \to \, \times \,\mathop \upsilon \limits^ \to \)
4
\(\mathop \upsilon \limits^ \to \, = \,\mathop r\limits^ \to \, \times \,\mathop \omega \limits^ \to \)