3. The principle of work and energy. A particle of mass m moves along a curve underthe action of a force F. If the speed of the particle at time t is v(t), its kinetic energyis defined to be mv². Prove that the change in kinetic energy in any time interval isequal to the work done by F during this time interval.

This is a problem of Kinetics, Application of differentiation.

Answered: . The principle of work and energy. A…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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#17
ds Determine the speed at time t (assume units of meters and seconds). dt ( t- 1 (In(3r² + 3), 5t), ds m/s dt t = 1
Use the function that describes the acceleration of an object that is in motion and the initial conditions to find the position of the object at ? = 2 a(t)=tj+tk , v(1)=5j r(1)=0
2.) Victor the custodian was withdrawing some cash from a local ATM when the machine malfunctioned and money began to fly out of the machine. The rate, in dollars per second, that money is coming out of the ATM is modeled by the function M'(t), where t is measured in seconds. Selected values for M'(t) are shown in the table below. t M'(t) 0 87 3 105 6 50 8 25 10 5 a.) Use a Left Riemann Sum with 4 subintervals indicated in the table to approximate the area under the curve M'(t) and above the t-axis from t = 0 to t = 10. b.) Use a Right Riemann Sum with 4 subintervals indicated in the table to approximate the area under the curve M'(t) and above the t-axis from t = 0 to t = 10. c.) Use a Midpoint Riemann Sum with 2 subintervals indicated in the table to approximate the area under the curve M'(t) and above the t-axis from t = 0 to t = 10.

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