In one dimensional motion, instantaneous speed `v` satisfies `(0 le v lt v_0)` then

In a two dimensional motion, instantaneous speed v_(0) is a positive constant. Then which of the following are neccessarily true?

In a two dimensional motion, instantaneous speed v_(0) is a positive constant. Then which of the following are neccessarily true?

In a two dimensional motion,instantaneous speed v_(0) is a positive constant.Then which of the following are necessarily true?

In a two dimensional motion,instantaneous speed v_(0) is a positive constant.Then which of the following are necessarily true?

In a two dimensional motion,instantaneous speed v_(0) is a positive constant.Then which of the following are necessarily true?

In the figure shown, the instantaneous speed of end A of the rod is v to the left. The angular velocity of the rod of length L must be

A particle is performing a linear simple harmonic motion. If the instantaneous acceleration and velocity of the particle are a and v respectively, identify the graph which correctly represents the relation between a and v .

An object , moving with a speed of 6.25 m//s , is decelerated at a rate given by : (dv)/(dt) = - 2.5 sqrt (v) where v is the instantaneous speed . The time taken by the object , to come to rest , would be :

Find 3-dimensional vectors vec v_1,vec v_2,vec v_3 satisfying vec v_1* vec v_1=4,vec v_1* vec v_2=-2,vec v_1* vec v_3=6, vec v_2* vec v_2=2 , vec v_2 *vec v_3=-5,vec v_3* vec v_3=29

A particle with mass m and initial speed V_(0) is a subject to a velocity-dependent damping force of the form bV^(n) .With dimensional analysis determine how the stopping time depends on m, V_(0) and b for begin with writing Deltat=Am^(alpha)b^(beta)V_(0)^(gamma) , powers alpha, beta and gamma will be.