Acceleration of a Particle#
The position of a particle in \(m\) is given by the function \(x = \)6\(t^3\) - 4\(t^2\) + 45, where \(t\) is in \(s\).
As you solve the questions below, you will be asked to find several times (\(t_1\), \(t_2\), \(t_3\), etc…) based on certain conditions.
Part 1#
At what time is \(v_x = 0\) \(m/s\)? Enter \(t_1\), the smallest of the values (if there is more than one).
Answer Section#
Please enter in a numeric value in \(s\).
Part 2#
At what time after \(t_1\) is \(v_x = 0\) \(m/s\) again? Enter \(t_2\), the next value.
Answer Section#
Please enter in a numeric value in \(s\).
Part 3#
What is the particle’s acceleration at the time \(t_1\)? Enter \(a\_{x,1}\), the acceleration corresponding to \(t_1\).
Answer Section#
Please enter in a numeric value in \(m/s^2\).
Part 4#
What is the particle’s acceleration at the time \(t_2\)? Enter \(a\_{x,2}\), the acceleration corresponding to \(t_2\).
Answer Section#
Please enter in a numeric value in \(m/s^2\).
Attribution#
Problem is licensed under the CC-BY-NC-SA 4.0 license.
