4. Determine the magnitude and angle Bof F so that the particle is in equilibrium. 45kN...
2. Determine the magnitude and directionof F so that the particle is in equilibrium 7 EN 3 kN Figure 2
Determine the magnitude and direction theta of F so that the particle is in equilibrium.
Q.3 Determine the two forces Fi and F2 so that the particle F is in equilibrium. F, 40 20° F 60 1b tv.
Q.3 Determine the two forces Fi and F2 so that the particle F is in equilibrium. F, 40 20° F 60 1b tv.
At the instant of the figure, a 4.10 kg particle P has a position vector r of magnitude 9.10 m and angle θ1 = 44.0° and a velocity vector v of magnitude 4.60 m/s and angle θ2= 33.0°. Force F,of magnitude 5.30 N and angle θ3 = 33.0° acts on P. All three vectors lie in the xy plane. About the origin, what are the magnitude of (a) the angular momentum of the particle and (b) the torque acting on...
Static Equilibrium of a Particle
A particle is subjected to three forces, F_1, F_2 and F_3. Forces and F_1 F_2 are defined with respect to the x and y axes as: Magnitude of F_1 = 9N Magnitude of F_2 = 10N Alpha = 57 degree beta = 59 degree Matlab input: Fl_mag = 9; F2_mag = 10; alpha = 57; beta = 59; Determine the magnitude and direction (angle 7) of F3 to maintain static equilibrium of the particle: Magnitude...
Determine the magnitude of F Determine the coordinate direction angle α of F3 Express your answer using three signiticant figures. Figure vPart C Determn* the coordinate direction angle β of F3
A charged particle is moving at an angle of 60 in a magnetic field of magnitude 2.5 Tesla directed along the positive X-axis as shown in the provided figure. The velocity of the particle is 2.98 x 10 m/sec directed counterclockwise from the positive x-axis. The magnitude of the charge is 1.61 x 10 "Coulombs. 8 points A. Calculate the magnitude of the magnetic force on the particle.
A force F⃗ of magnitude F making an angle θ with the x axis is
applied to a particle located along axis of rotation A, at
Cartesian coordinates (0,0) in the figure. The vector F⃗ lies in
the xy plane, and the four axes of rotation A, B, C, and D all lie
perpendicular to the xy plane.
A particle is located at a vector position r⃗ r→r_vec with
respect to an axis of rotation (thus r⃗ r→r_vec points from...
At the instant of the figure, a 7.90 kg particle P has
a position vectorr→of magnitude 5.20 m and angleθ1 = 44.0° and a velocity vectorv→of magnitude
5.10 m/s and angle θ2 = 29.0°. ForceF→, of
magnitude 6.60 N and angle θ3 = 29.0° acts onP. All three vectors lie in the xy plane. About
the origin, what are the magnitude of (a) the
angular momentum of the particle and (b) the
torque acting on the particle?
1. Determine the magnitude R of the resultant and the angle between the line of action of the resultant and the x-axis for the two forces shown F1 =400 N 6 60° F2 300 N 2. Determine the magnitude R of the resultant and the angle between the line of action of the resultant and the x axis for the four forces shown 12 F4 10 kN 12 3. Three forces are applied to a bracket mounted on a post...