Answer to Question #291315 in Mechanics | Relativity for ipen

Explanation.

• Differentiating the given function one with respect to time gives the function for instantaneous velocity.
• Integrating a distance function with respect to time gives the total distance covered over a period.

a)

• For this part, integrate the given distance function with respect to time.
• Then you get the total distance covered during t=0 and t=10.
• Then divide the obtained value by the tim interval to obtain the average velocity.

"\\qquad\\qquad\n\\begin{aligned}\n\\small \\int_0^{10}x(t)&=\\small \\text{total distance}\\\\\n\\\\\n\\small v_{avg}&=\\small \\frac{\\text{total distance}}{(10-0)}\n\\end{aligned}"

b)

• Just calculate the instantaneous velocities by substituting time values into the velocity function that is obtained by differentiating the distance function once with respect to time.

"\\qquad\\qquad \\small v=\\frac{dx(t)}{dt}\\\\\n\\qquad\\qquad \\small v(t=0)\\,\\&\\,v(t=5)\\\\"