. The motion of a particle connected to a spring is described by x 10 cos...
The motion of a particle is given by x(t)=(25cm)cos(13t), where t is in s. At what time is the kinetic energy equal to twice the potential energy for the first time?
The motion of a particle given by x(t)=(25cm)cos(14t) , where t is in s. What is the first time the kinetic energy is twice the potential energy?
The motion of a particle is given by x(t)=(25cm)cos(12t), where t is in s. What is the first time the kinetic energy is twice the potential energy?
The motion of a particle is given by x(t)=(25cm)cos(10t), where t is in s. What is the first time at which the kinetic energy is twice the potential energy?
A particle attached to a spring with k = 54 N/m is undergoing simple harmonic motion, and its position is described by the equation x = (5.5 m)cos(7.1t), with t measured in seconds (a) What is the mass of the particle? kg (b) What is the perlod of the motion? (c) What is the maximum speed of the particle? m/s (d) What Is the maximum potentlal energy? (e) What is the total energy?
Problem 14.36 The motion of a particle is given by x(t)=(25cm)cos(15 (rad/s)?t ), where t is in s. Part A What is the first time at which the kinetic energy is twice the potential energy?
Can you please answer both questions, Y=0 Problem3 A (2+0.1y) kg block attached to a spring undergoes simple harmonic motion described by x (30 cm) cos[(6.28 rad/s)t + /4) Determine (a) the amplitude, (b) the spring constant, (c) the frequency, (d) the maximum speed (e) maximum acceleration of the block, and (e) the total energy of the spring-block. of the block Problem 4 A block attached to a spring, undergoes simple harmonic motion with a period of 1.5 + y)...
The motion of an object is described by the equation below. x = (0.50 m) cos(π t / 9) (a) Find the position of the object at t = 0 and at t = 0.30 s. (b) Find the amplitude of the motion. (c) Find the frequency of the motion. (d) Find the period of the motion.
consider a particle attached to a spring executing a motion x=Asin (wt + gamma) with A=0.32m at t=0, it is at x=-0.07m and velocity -2m/s . the total energy is 5.6j . Find (i) gamma (ii) frequency (iii) spring constant (iv) mass
z waqod A 2- kg block attached to a spring undergoes simple harmonic motion described by = (30 cm) cos[(6.28 rad/s)t + /4]. Determine (a) the amplitude, (b) the spring constant, (c) the frequency, (d) the maximum speed of the block, (e) maximum acceleration of the block, and (e) the total energy of the spring-block. Problem 3 A block attached to a spring, undergoes simple harmonic motion with a period of 1.5 s, and amplitude of 20 cm. The mechanical...