[" (d) "-1/x],[" (d) "" displacement "x"...

[" (d) "-1/x],[" (d) "" displacement "x" of a particle varies with time tas "],[" " "x=ae^(-at)+be^(beta t)" ,where "a,b,alpha" and "beta" are positive "],[" constants.The velocity of the particle will "],[" constants.The velocity of the particle will "],[" (a) go on decreasing with time "],[" (a) be independent of "alpha" and "beta],[" (b) drop to zero when "alpha=beta],[" (d) go on increasing with time "]

Similar Questions

Explore conceptually related problems

The displacement x of a particle varies with time t as x = ae^(-alpha t) + be^(beta t) . Where a,b, alpha and beta positive constant. The velocity of the particle will.

The displacement x of a particle varies with time as x=a e^(alphat)+be^(betat) where a,b,a, beta are constants and are positives. The velocity of the particle will:

Displacement of particle changes with respect to time according to equation x =ae ^(-alpha t) + be ^(betat) where a, b, a and Bare positive constants, then velocity of particle is ......

The displacement (x) of particle depends on time (t) as x = alpha t^(2) - beta t^(3) .

A particle is acted upon by a force given by F = - alphax^(3) -betax^(4) where alpha and beta are positive constants. At the point x = 0, the particle is –

The velocity of a particle varies with time as per the law vec(V) = vec(a) + vec(b)t where vec(a) and vec(b) are two constant vectors. The time at which velocity of the particle is perpendicular to velocity of the particle at t= 0 is

Displacement (x) of a particle is related to time (t) as x = at + b t^(2) - c t^(3) where a,b and c are constant of the motion. The velocity of the particle when its acceleration is zero is given by:

Similar Questions

Recommended Questions