Figure Q1(b) shows a mass of 5kg, in a water tank, is connected with a spring. The mass is pulled down as far as x with an initial Force of Fo = 4N. The spring coefficient and the damping coefficient are known, k 10N/m and b = 15kg/s, respectively (b) (i) Derive the empirical equation of the homogeneous solution (ii) Compute the homogeneous solution if initial conditions are given, y(0) = 1 and y'(0) = -7. (iii) If the function of Force at particular time is given as F(t) = Fo sin wžt. Determine the particular solution. (iv) Evaluate the General equation of non-homogeneous solution.

Figure Q1(b) shows a mass of 5kg, in a water tank, is connected with a spring. The mass is pulled down as far as x with an initial Force of Fo = 4N. The spring coefficient and the damping coefficient are known, k 10N/m and b = 15kg/s, respectively (b) (i) Derive the empirical equation of the homogeneous solution (ii) Compute the homogeneous solution if initial conditions are given, y(0) = 1 and y'(0) = -7. (iii) If the function of Force at particular time is given as F(t) = Fo sin wžt. Determine the particular solution. (iv) Evaluate the General equation of non-homogeneous solution.

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Description: Need step by step Figure Q1(b): Mass spring damping systemkmF(t) Figure Q1(b) shows a mass of 5kg, in a water tank, is connected with aspring. The mass is pulled down as far as x with an initial Force of Fo =4N. The spring coefficient and the damping

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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Figure Q1(b): Mass spring damping system
k
m
F(t)

Figure Q1(b) shows a mass of 5kg, in a water tank, is connected with a
spring. The mass is pulled down as far as x with an initial Force of Fo =
4N. The spring coefficient and the damping coefficient are known, k
10N/m and b = 15kg/s, respectively
(b)
(i)
Derive the empirical equation of the homogeneous solution
(ii)
Compute the homogeneous solution if initial conditions are given,
y(0) = 1 and y'(0) = -7.
(iii)
If the function of Force at particular time is given as F(t) =
Fo sin wžt. Determine the particular solution.
(iv)
Evaluate the General equation of non-homogeneous solution.

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