Answer:
a) ω1 = 18rpm ω2 = -18rpm
b) ω1 = 102rpm ω2 = 138rpm
c) ω1 = ω2 = 3.18rpm
Explanation:
For the first case, we know that each wheel will spin in a different direction but with the same magnitude, so:
ωr = 6rpm This is the angular velocity of the robot
[tex]\omega = \frac{\omega r * D/2}{r_{wheel}}[/tex] where D is 30cm and rwheel is 5cm
[tex]\omega = \frac{6 * 30/2}{5}=18rpm[/tex] One velocity will be positive and the other will be negative:
ω1 = 18rpm ω2 = -18rpm
For part b, the formula is the same but distances change. Rcircle=100cm:
[tex]\omega 1 = \frac{\omega r * (R_{circle} - D/2)}{r_{wheel}}[/tex]
[tex]\omega 2 = \frac{\omega r * (R_{circle} + D/2)}{r_{wheel}}[/tex]
Replacing values, we get:
[tex]\omega 1 = \frac{6 * (100 - 30/2)}{5}=102rpm[/tex]
[tex]\omega 2 = \frac{\omega r * (100 + 30/2)}{5}=138rpm[/tex]
For part c, both wheels must have the same velocity:
[tex]\omega = \frac{V_{robot}}{r_{wheel}}=20rad/min[/tex]
[tex]\omega = 20rad/min * \frac{1rev}{2*\pi rad}=3.18rpm[/tex]
