Background Review

1. Background Review • Elementary functions • Complex numbers • Common test input signals • Differential equations • Laplace transform • Examples • properties • Inverse transform • Partial fraction expantion • Matlab

2. Elementary functions

3. The most beautiful equation • It contains the 5 most important numbers: 0, 1, i, p, e. • It contains the 3 most important operations: +, *, and exponential. • It contains equal sign for equations

4. Elementary functions

5. Elementary functions

6. Elementary functions

7. Elementary functions

8. Elementary functions • F(t)=3sin 3t +4cos 3t • F(t)=Asin(3t-d)=Acosd sin3t –Asin d cos3t • Acos d =3 • Asin d =-4 • A2=25, A=5 • tan d =-4/3, d=-53.13o • F(t)=5sin(3t+53.13o)

9. Complex Numbers • X2+1=0  x=i where i2=-1 • X2+4=0, then x=2i, or 2j • If z1=x1+iy1, z2=x2+iy2 • Then z1+ z2= (x1+ x2)+i(y1 +y2) • z1 z2=(x1+iy1)(x2+iy2)=(x1x2 -y1y2) +i(x1y2 +x2y1)

10. Polar form of Complex Numbers • z=x+iy, let’s put x=rcosq, y= rsinq • Then z = r(cosq+i sinq) = r cisq = rq • Absolute value (modulus) r2=x2+y2 • Argument q= tan-1(y/x) • Example z=1+i

11. Euler Formula • z=x+iy • ez =ex+iy= ex eiy= ex (cos y+i sin y) • eix =cos x+i sin x = cis x • | eix | = sqrt(cos2 x+ sin2 x) = 1 • z=r(cosq+i sinq)=r eiq • Find e1+i • Find e-3i

12. In Matlab >> z1=1+2*i z1 = 1.0000 + 2.0000i >> z2=3+i*5 z2 = 3.0000 + 5.0000i >> z3=z1+z2 z3 = 4.0000 + 7.0000i >> z4=z1*z2 z4 = -7.0000 +11.0000i >> z5=z1/z2 z5 = 0.3824 + 0.0294i >> r1=abs(z1) r1 = 2.2361 >> theta1=angle(z1) theta1 = 1.1071 >> theta1=angle(z1)*180/pi theta1 = 63.4349 >> real(z1) ans = 1 >> imag(z1) ans = 2

13. Poles and zeros • Pole of G(s) is a value of s near which the value of G goes to infinity • Zero of G(s) is a value of s near which the value of G goes to zero.

14. Poles and zeros in Matlab >> s=tf(‘s’) Transfer function: s >> G=exp(-2*s)/s/(s+1) Transfer function: 1 exp(-2*s) * ----------- s^2 + s >> pole(G) ans = 0, -1 >> zero(G) ans = Empty matrix: 0-by-1

15. Test waveforms used in control systems

16. 1st order differential equations • y’ + a y = 0; y(0)=C, and zero input • Solution: y(t) = Ce-at • y’ + a y = d(t); y(0)=0, input = unit impulse • Unit impulse response: h(t) = e-at • y’ + a y = f(t); y(0)=C, non zeroinput • Total response: y(t) = zero input response + zero state response = Ce-at + h(t) * f(t) • Higher order LODE: use Laplace

17. Laplace Transform • Definition and examples Unit Step Function u(t)

18. Laplace Transform

19. Name:____________ The single most important thing to remember is that whenever there is feedback, one should worry about __________

20. Laplace Transform

21. Laplace Transform

22. Laplace Transform

23. Laplace Transform

24. Laplace transform table

25. Laplace transform theorems

26. Laplace Transform

27. Laplace Transform

28. Laplace Transform

29. Laplace Transform • y”+9y=0, y(0)=0, y’(0)=2 • L(y”)=s2Y(s)-sy(0)-y’(0)= s2Y(s)-2 • L(y)=Y(s) • (s2+9)Y(s)=2 • Y(s)=2/ (s2+9) • y(t)=(2/3) sin 3t

30. Matlab F=2/(s^2+9) F = 2/(s^2+9) >> f=ilaplace(F) f = 2/9*9^(1/2)*sin(9^(1/2)*t) >> simplify(f) ans = 2/3*sin(3*t)

31. Laplace Transform • y”+2y’+5y=0, y(0)=2, y’(0)=-4 • L(y”)=s2Y(s)-sy(0)-y’(0)= s2Y(s)-2s+4 • L(y’)=sY(s)-y(0)=sY(s)-2 • L(y)=Y(s) • (s2+2s+5)Y(s)=2s • Y(s)=2s/ (s2+2s+5)=2(s+1)/[(s+1)2+22]-2/[(s+1)2+22] • y(t)= e-t(2cos 2t –sin 2t)

32. Matlab >> F=2*s/(s^2+2*s+5) F = 2*s/(s^2+2*s+5) >> f=ilaplace(F) f = 2*exp(-t)*cos(2*t)-exp(-t)*sin(2*t)

33. Laplace transform • Y”-2 y’-3 y=0, y(0)= 1, y’(0)= 7 • Y”+2 y’-8 y=0, y(0)= 1, y’(0)= 8 • Y”+2 y’-3 y=0, y(0)= 0, y’(0)= 4 • 4Y”+4 y’-3 y=0, y(0)= 8, y’(0)= 0 • Y”+2 y’+ y=0, y(0)= 1, y’(0)= -2 • Y”+4 y=0, y(0)= 1, y’(0)= 1

34. Y”+2 y’+ y=0, y(0)= 1, y’(0)= -2 >> A=[0 1;-1 -2]; B=[0;1]; C=[1 0]; D=0; >> x0=[1;-2]; >> t=sym('t'); >> y=C*expm(A*t)*x0 y = exp(-t)-t*exp(-t) Y”+2 y’+ y=f(t)=u(t), y(0)= 2, y’(0)= 3

35. Partial Fraction

36. Partial Fraction

37. Partial fraction; repeated factor

38. Partial fraction; repeated factor But No FUN

39. Partial fraction; exercise

40. Matlab >> [r p k]=residue(n,d) r = 1 2 p = 1 0 k = [] >> d=[1 -1 0] d = 1 -1 0 >> n=[3 -2] n = 3 -2 1/(s-1) + 2/s

41. Matlab >> [r p k]=residue(n,d) r = 1.5000 -1.5000 1.0000 p = 3 -3 0 k = [] >> n=[1 9 -9] n = 1 9 -9 >> d=[1 0 -9 0] d = 1 0 -9 0 1.5/(s-3)-1.5/(s+3)+1/s

42. Matlab >> [r p k]=residue(n,d) r = 2.0000 -3.0000 1.0000 p = 2.0000 -2.0000 1.0000 k = [] >> n=[11 -14] n = 11 -14 >> d=[1 -1 -4 4] d = 1 -1 -4 4 2/(s-2)-3/(s+2)+1/(s-1)

43. Matlab >> [r p k]=residue(a,b) r = 1 -1 p = -1 -1 k = [] >> b=[1 2 1] b = 1 2 1 >> a=[1 0] a = 1 0 1/(s+1)-1/(s+1)2

44. >> Y=(s^4-7*s^3+13*s^2+4*s-12)/s^2/(s-3)/(s^2-3*s+2) Transfer function: s^4 - 7 s^3 + 13 s^2 + 4 s - 12 ------------------------------------ s^5 - 6 s^4 + 11 s^3 - 6 s^2 >> [n,d]=tfdata(Y,'v') n = 0 1 -7 13 4 -12 d = 1 -6 11 -6 0 0 >> [r,p,k]=residue(n,d) r = 0.5000 -2.0000 -0.5000 3.0000 2.0000 p = 3.0000 2.0000 1.0000 0 0 k = [ ]