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
consider a particle attached to a spring executing a motion x=Asin (wt + gamma) with A=0.32m...
The motion of a particle is given by x=Asin^3(wt). a) What is the amplitude of the particles's motion? b)What is the expression for the particle's velocity? c) What is the expression for the particle's acceleration?
c) The equation below describes the position r of a block attached to a spring at time t: x(t)-x,n cos (wt + ?) i. (2 marks) Explain in words the physical meaning of the variables xm, ? and ?. ii. (2 marks) Derive an expression for the velocity of the block. iii. (2 marks) The spring constant of your oscillator is 400 N/m. At some time the position, velocity and acceleration of the block are r-0.100 m, v- 13.6 m/s...
How to answer all of this? Soalan Consider a particle attached to a spring executing a motion x Asin(ot +0) with A 0.32 m,t 0, x= -0.07 m and a velocity -2 m/s. The total energy is 5.6 J.Determine, A-0324 Pertimbangkan partike! yang dipasangkan pada pegar melakranakan gerakan xAsin (at0 dengan A 0.32 m, 0 a berada pada x = 0.07 m dan halaju-2 m/ V=-L Jumlah tenaga adalah 5.6 J. Tentukan (i) phase, 0.22 a fasa e (5 Marks/Markah)...
An object with mass 2.3 kg is executing simple harmonic motion, attached to a spring with spring constant 270 N/m . When the object is 0.015 mfrom its equilibrium position, it is moving with a speed of 0.65 m/s . A) Calculate the amplitude of the motion. B) Calculate the maximum speed attained by the object.
use the answers to answer d,e, and f A mass is attached to a spring and is oscillating in simple harmonic motion as shown in the figure. DOKS y (cm) BA Time (s) a) What is the period and the frequency of this motion? (2p) period: T=4.85 frequency: f = 1 / 2 = 1 = 0.208 b) Determine the amplitude (1p) A = 6cm Hz c) At which of the labelled points A-E is (4) 1. The speed greatest...
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?
10. A 317 g particle attached to a horizontal spring moves in simple harmonic motion with a period of 0.300 s. The total mechanical energy of the spring-mass system is 5.26 J. A. What is the maximum speed of the particle? [3 points) B. What is the spring constant? [3 points] C. What is the amplitude of the motion? [3 points
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)...
A mass of 2.5 kg is attached to a spring that has a value of k = 600 N/m. The mass at equilibrium (xo=0) receives an impulse that gives it a velocity of vo =+ 1.5 m/s at t-0. a) Determine the value of the critical damping constant b that is required for critical damping b) Change the critical value of b by a factor of two so we have an overdamped system. (It's your job to figure out if...
help me with this Consider the vibration of mass spring system given by the initial value problem m d²x dt2 dx +b. dt + kx = 0 x(0)=0, x'(0) = 1 Where m, b, k are nonnegative constants and b2 < 4mk. Show that a solution to the problem is given by b2 2m e 2m sin 4mk-b2 4mk 2m t (CO2:P01 - 8 Marks) b. A 200 g mass stretches a spring 5 cm. If it is release from...