ME 440 Intermediate Vibrations

1. ME 440Intermediate Vibrations Tu, January 27, 2009 Sections 1.10 & 1.11 © Dan Negrut, 2009ME440, UW-Madison

2. Before we get started… • Last Time: • Discussed two examples of how to determine equivalent spring • Discussed the concept of linear system and how to linearize a function • Covered material out of 1.8, 1.9 • Equivalent mass, damping elements • Today: • HW Assigned: 1.34 and 1.66 out of the text • HW due in one week • Covering material out of 1.10, maybe start 1.11 • Periodic Functions and Fourier Series Expansion 2

3. General Concepts • Periodic Motion: motion that repeats itself after an interval of time  •  is called the period of the function • Harmonic Motion: a particular form of periodic motion represented by a sine or cosine function • Very Important Observation: Periodic functions can be resolved into a series of sine and cosine functions of shorter and shorter periods (more to come, see Fourier series expansion): 3

4. Plot below shows time evolution of function Sinusoidal Wave • The motion with no friction of the system below (mass-spring system) leads to a harmonic oscillation • Formally discussed in Chapter 2 • Nomenclature: 4

5. Harmonic Motion (Cntd) • If displacement x(t) represented by a harmonic function, same holds true for the velocity and acceleration: • Quick remarks: • Velocity and acceleration are also harmonic with the same frequency of oscillation, but lead the displacement by /2 and  radians, respectively • For high frequency oscillation ( large), the kinetic energy, since it depends on , stands to be very large (unless the mass and/or A is very small…) • That’s why it’s not likely in engineering apps to see large A associated with large  5

6. Exercise • Show that you can always represent a generic harmonic function as the sum of two other harmonic functions of the same frequency  • Specifically, for any X and  in , find A and B such that • Note that  in equation above is arbitrary • Alternatively, the formula above can be reformulated as (showing only cosine functions on the right side) 6

7. Review of Complex Algebra • The need for complex numbers • Solve “characteristic equation” (concept to be introduced later): • Roots: • To make life simpler, use notation • Using notation, roots above become: • Incidentally, the following hold: 7

8. Complex Numbers:From Algebraic Representation to Geometric Representation • Representation of complex number z=a+bj provided below • Note that • Therefore, 8

9. Dwelling on the Construct(Euler’s Formula) • Use Taylor expansion for sine and cosine • Sum up and interleave terms to get: • In other words, we got Euler’s formula: • It follows that our complex number z can be expressed as 9

10. Algebra of Complex Numbers • Multiplication • Division • Integer powers • Roots of order n 10

11. A Brief Excursion • Suppose I have a complex number that changes in time. That is, the real and imaginary part change in time: • The first two time derivatives of this function of time are: • The important observations are as follows (commutability): • This will be used in conjunction with Fourier Series Expansion 11

12. A Brief Excursion (Cntd) • Why is this important? • Imagine that you are interested in a quantity which happens to be the real part of a complex number . • Then, if you want to find out the value of then simply look at the real part of and the real part of its derivatives: • The same general remark holds for the Fourier series expansion • If you want to find the Fourier series expansion of then get the Fourier series expansion of . The real part of this expansion is going to be the expansion of . 12

13. Begin Section 1.11 (Harmonic Analysis) 13

14. Intro to Fourier Series • Joseph Fourier - French mathematician (1768 – 1830) • Fourier’s doctoral adviser was Lagrange, whose doctoral adviser was Euler, whose doctoral adviser was Bernoulli, whose adviser was another Bernoulli, whose adviser was Leibniz. The latter had no adviser, he invented Calculus (at the same time as Newton). • Fourier’s doctoral students included Dirichlet, who later was the adviser of Kroneker, who later was the adviser of Cantor. 14

15. Key Result (Fourier) • Any periodic function of period  can be represented by a series of sin and cosine which are harmonically related • Here • When is a function f(t) periodic though? • A function is periodic if there is a positive, constant, and finite  such that • Note:  is called the period of the function 15

16. Periodic Functions, Examples 16

17. Fourier Expansion, Definition 17

18. Getting Odd, Getting Even • A function is odd provided • A function is even provided 18

19. Example 1. • Determine the Fourier expansion of the following periodic function: 19