Question 3 5 pts Solve for the velocity at point B in m/s. You may assume...
Question 3 5 pts Solve for the angular velocity of link AB in rad/s. You may assume point A is moving in the-y direction and point B moves in the x-direction. y А х 0.2m TBA va = 2 m/s 45° SB B
Solve for the velocity at point B in m/s. You may assume point A is moving in the -y direction and point B moves in the x-direction. y А, X TB/A 0.2m 3 VA = 2 m/s| 45° B
Solve for the velocity at point B in m/s. You may assume point A is moving in the -y direction and point B moves in the x-direction. у AC 0.2m - TB/A VA = 2 m/s 45° ω B NB
Solve for the velocity at point B in m/s. You may assume point A is moving in the -y direction and point B moves in the x-direction. y А, 0.2m х B/A VA = 2 m/s | 45° o B VB
Solve for the angular velocity of link AB in rad/s. You may assume point A is moving in the -y direction and point B moves in the x- direction. у A X TB/A 0.2m VA = 2 m/s 45° B VB
"Solve for the velocity at point B in m/s. You may assume point Cis moving in the -y direction and point B moves in the x-direction. у С х WCB 0.2 m vc = 2 m/s rB/C B VB 0.2 m
Solve for the angular velocity of link BC in rad/s. You may assume point C is moving in the -y direction and point B moves in the x-direction. у ФСВ 0.2 m Vc = 2 m/s IB/C B VB 0.2 m
At the instant represented, the velocity of point A of the 2.06-m bar is 3.1 m/s to the right. Determine the speed Va of point B and the magnitude of the angular velocity w of the bar. The diameter of the small end wheels may be neglected. 0.52 m 59° BC 2.06 m А VA Answers: Va = m/s rad/s
3. A 5 kg particle moves in the +x direction with a velocity of 6 m/s shown in the figure below. You are told that it makes an elastic collision with a 2kg particle that is initially at rest. After the collision, the 2 kg particle moves with a speed of 5 m/s in the direction 30° above the x-axis. (a) What are the x and y components of the 5 kg particle after the collision? (20 points) (b) Were...
Question 3) The diagram is about the motion of an object in the xy plane: Overall the object starts at point A on the +y axis, moves in the-y direction until reaching the origin of coordinates where it makes a right angle turn and moves in the +x direction until reaching point D on the x-axis. The speed is not constant and we know more detail about the motion at only four points: When t-0.00s] it is at point A...