A particle of mass \( m \) moves along the \( x \)-axis. Its position varies with time according to \( x = 6t^3 - 6t^2 \), where \( x \) is in meters and \( t \) is in seconds.**Determine the velocity \( v(t) \) of the particle as a function of \( t \).**\[ v(t) = 18t^2 - 12t \]**Determine the acceleration \( a(t) \) of the particle as a function of \( t \).**\[ a(t) = 36t - 12 \]**Determine the power \( P(t) \) delivered to the particle as a function of \( t \).**\[ P(t) = (36t - 12)(18t^2 - 12t) \]*Incorrect***Determine the work \( W \) done on the particle by the net force from \( t = 0 \) to \( t = t_1 \) in terms of defined variables and numerical constants.**\[ W = 162t_1^4 - 216t_1^3 + 72t_1^2 \]*Incorrect***Additional Information:**- The velocity function \( v(t) \) is derived by differentiating the position function \( x(t) \) with respect to time \( t \).- The acceleration function \( a(t) \) is derived by differentiating the velocity function \( v(t) \) with respect to time \( t \).- The power \( P(t) \) is given as a product of two expressions, but marked incorrect.- The work \( W \) is expressed using the integral of force over time, however, it is also marked incorrect.

Name: A particle of mass \( m \) moves along the \( x \)-axis. Its position
Uploaded: 2024-03-20T06:57:16.000Z
Channel: Bartleby
Description: A particle of mass \( m \) moves along the \( x \)-axis. Its position varies with time according to \( x = 6t^3 - 6t^2 \), where \( x \) is in meters and \( t \) is in seconds.**Determine the velocity \( v(t) \) of the particle as a function of \( t