The velocity of the geometric point $P$ can be described relative to either rod. The velocity $\vec{v}_P$ is the vector sum of the rod’s rotational velocity at that point and the sliding velocity of the intersection along the rod.

• For Rod AB: $\vec{v}_P = \vec{v}_{rot,1} + v_{\parallel} \hat{u}_1$ (where $\hat{u}_1$ is along AB)
• For Rod CD: $\vec{v}_P = \vec{v}_{rot,2} + v_{slide,2} \hat{u}_2$ (where $\hat{u}_2$ is along CD)

We need to find $v_{\parallel}$ (component along AB). To eliminate the unknown sliding velocity along CD ($v_{slide,2}$), we take the component of the velocity perpendicular to Rod CD.

Equating the components along the normal to rod CD ($\hat{n}_2$):

Analyzing the dot products (where angle between rods is $\theta = \beta – \alpha$):

• $\vec{v}_{rot,2}$ is purely parallel to $\hat{n}_2$, so its projection is just $l_2 \omega_2$.
• $\vec{v}_{rot,1}$ makes an angle $\theta$ with $\hat{n}_2$, projection is $l_1 \omega_1 \cos \theta$.
• $\vec{v}_{\parallel}$ makes an angle $90+\theta$ with $\hat{n}_2$, projection is $v_{\parallel} \sin \theta$.

Substitute angular velocities $\omega_1 = v_1/L$ and $\omega_2 = v_2/L$ (noting opposite rotation directions):

Substitute $l_1$ and $l_2$ from Step 1:

Using the expansion $\sin \alpha = \sin(\beta – (\beta-\alpha)) = \sin\beta \cos(\beta-\alpha) – \cos\beta \sin(\beta-\alpha)$: