A particle with mass m and initial speed...

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.

Similar Questions

Explore conceptually related problems

A particle moves with an initial velocity v_(0) and retardation alpha v , where v is the velocity at any time t.

A particle moves with an initial velocity V_(0) and retardation alpha v , where alpha is a constant and v is the velocity at any time t. After how much time, speed of particle decreases by 75%

A particle moves with an initial velocity V_(0) and retardation alpha v , where alpha is a constant and v is the velocity at any time t. Velocity of particle at time is :

A particle moves with an initial velocity V_(0) and retardation alpha v , where alpha is a constant and v is the velocity at any time t. total distance covered by the particle is

Velocity of a particle at time t is expressed as follows : v= alpha t+(beta)/(t +gamma) Dimensions of alpha, beta " and "gamma are respectively.

A particle of mass m, moving in a circle of radius R, has a velocity v=v_(0)(1-e^(-gamma t)) The power delivered to tha particle by the force at t=0 is

Similar Questions

Recommended Questions