4 Bar Link Calculator Page

Second derivatives provide angular accelerations, essential for force and inertia calculations.

Solving for (\theta_3) and (\theta_4) (the coupler and follower angles) requires solving a , often handled via the Freudenstein equation:

The angle between the coupler and follower—critical for force transmission. Values near (90^\circ) are ideal; below (40^\circ) or above (140^\circ) cause poor mechanical advantage. 4 bar link calculator

Differentiating the loop equations yields angular velocities using the known input angular velocity.

where (K_1, K_2, K_3) are constants derived from link lengths. A 4-bar link calculator automates this solution, handling the two possible assembly configurations (open vs. crossed). A comprehensive 4-bar link calculator typically offers: crossed)

[ K_1 \cos\theta_4 + K_2 \cos\theta_2 + K_3 = \cos(\theta_2 - \theta_4) ]

[ \mathbf{r}_1 + \mathbf{r}_2 = \mathbf{r}_3 + \mathbf{r}_4 ] plus the coupler point position.

Given link lengths and crank angle, output the angles of the coupler and follower, plus the coupler point position.