The position of a moving particle in vortex is expressed as, x(t) = x0 sin(a√t + bt^2) where x0 isthe position at t = 0, x (t) is the position at time t, and a and b are the constants. Using dimensionalanalysis find the units of the constants a and b? Question 4:a. The position of a moving particle in vortex is expressed as, x(t) = x, sin(avE + bt?) where xo isthe position at 1 = 0, x (1) is the position at time 1, and a and b are the constants. Using dimensionalanalysis find the units of the constants a and b?

An equation holds correct if the dimensions of the quantities involved in both sides of the equation…

The position of a moving particle in vortex is expressed as, x(t) = x0 sin(a√t + bt^2) where x0 is the position at t = 0, x (t) is the position at time t, and a and b are the constants. Using dimensional analysis find the units of the constants a and b?

The position of a moving particle in vortex is expressed as, x(t) = x0 sin(a√t + bt^2) where x0 is the position at t = 0, x (t) is the position at time t, and a and b are the constants. Using dimensional analysis find the units of the constants a and b?

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The position of a moving particle in vortex is expressed as, x(t) = x0 sin(a√t + bt^2) where x0 is
the position at t = 0, x (t) is the position at time t, and a and b are the constants. Using dimensional
analysis find the units of the constants a and b?