AEM Fourier series
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power point presentation on Fourier series.
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AEM Fourier series
- 2. There are too many functions which can be represented in form of infinite series but in modern science and engineering many problem connected with oscillation, which require to express in terms of sine and cosines known as a Fourier series .
- 3. It has a very wide application infield of digital signal processing ,wave forms of electrical fields, vibrations, and conduction of heat and etc. Mathematician and physicist has used it very first time in theory of heat conduction.
- 4. the Fourier series for the f(x)in the interval of is given by the trigonometric series : }sincos{ 2 0 0 nxbnxa a nn n Here are called Fourier coefficients. 2cxc nn baa ,,0
- 5. 0 0 )sin()( n nn nxcAxf 2 0 0 a A 22 nnn bac n n n b a1 tan
- 6. }sincos{ 2 0 0 nxbnxa a nn n We find Fourier series in form of: oAs we see in the equation we have three constants we find that constant coefficient nn baa ,,0 oWe find the value of that coefficients using Fourier series nn baa ,,0
- 7. 2 0 0 20 )( 1 00 2 c c c c xfa a x a }sincos{ 2 )( 22 1 2 0 2 nxbnxa a xxf c c n c c n n c c c c Apply integration both sides in the equation: To find :0a Orthogonal property of sine and cosine
- 8. To find :na xnxxfa a xnxa c c n n c c n cos)( 1 0cos0 2 2 2 }sincoscoscos{cos 2 cos)( 22 1 2 0 2 xnxnxbnxnxaxnx a xnxxf c c n c c n n c c c c Orthogonal property of sine and cosine
- 9. To find :nb }sinsincossin{sin 2 sin)( 22 1 2 0 2 xnxnxbnxnxaxnx a xnxxf c c n c c n n c c c c xnxxfa b xnxb c n n c c n sin)( 1 0sin0 2 0 2 2 20 x c x Orthogonal property of sine and cosine
- 11. 1. Even functions: let f(x) be a function defined over the symmetrical interval –L ≤ x ≤ L. Then the function f(x) is said to be even if f(-x) = f(x).
- 12. When is a even function then is a even and is an odd function. Thus )(xf nxxf cos)( nxxf sin)( xxfxxfa 0 0 )( 2 )( 1 0sin)( 1 cos)( 2 )( 1 0 xxfb xnxxfxosncxfa n n nxa a xf n n cos 2 )( 0 0
- 13. If function ƒ(x) is an even periodic function with the period 2L (–L ≤ x ≤ L), then ƒ(x)cos(nпx/L) is even while ƒ(x)sin(nпx/L) is odd. Thus the Fourier series expansion of an even periodic function ƒ(x) with period 2L (–L ≤ x ≤ L) is given by, L nx a a xf n n cos 2 )( 1 0 dxxf L a L 0 0 )( 2 Where, ,2,1cos)( 2 0 ndx L xn xf L a L n 0nb
- 14. 2.Odd functions: let f(x) be a function defined over the symmetrical interval –L ≤ x ≤ L. Then the function f(x) is said to be odd if f(-x) = -f(x).
- 15. xxfxxfb xosncxfa xxfa n n sin)( 2 sin)( 1 0)( 1 0)( 1 0 0 nxbxf n n sin)( 1 When is a odd function then is a even and is an odd function. )(xf nxxf sin)( nxxf cos)( ODD FUNCTIONS
- 16. If function ƒ(x) is an even periodic function with the period 2L (–L ≤ x ≤ L), then ƒ(x)cos(nпx/L) is even while ƒ(x)sin(nпx/L) is odd. Thus the Fourier series expansion of an odd periodic function ƒ(x) with period 2L (–L ≤ x ≤ L) is given by, )sin()( 1 L xn bxf n n Where, ,2,1sin)( 2 0 ndx L xn xf L b L n ODD FUNCTIONS
- 17. General rules: ▪ even* even = even function ▪ odd*odd=odd function ▪ Even*odd=odd function ▪ Even+even=even ▪ Odd+odd=odd ▪ Even odd= neither even nor odd xx cos2 xx sin5 xx sin2 xx cos xx sin
- 20. Question1: Find the Fourier series of Solution.: The Fourier series of ƒ(x) is given by, Using above, dxxfa )( 1 0 dxxx )( 1 2 23 1 23 xx xxxxf 2 )(
- 21. 2323 1 22 33 0 3 3 2 a nxdxxfan cos)( 1 Now, xxxf 2 )( 2 22 22 32 2 )1(4 )1( )12( )1( )12( 1 cos )12( cos )12( 1 sin )2( cos )12( sin )( 1 n nn n n n n n nx n nx x n nx xx n nn
- 22. n n nn n nx n nx x n nx xx n n nn )1(2 )1( )1( )( )1( )(1 cos )2( sin )12( cos )( 1 22 22 32 2 nxdxxx sin)( 1 2 nxdxxfbn sin)( 1 Now, Hence fourier series of, f(x) = x2+x, 1 2 2 2 sin )1(2 cos )1(4 3 n nn nx n nx n xx
- 23. Expand in a Fourier series. Solution xx x xf 0, 0,0 )( 22 1 )(0 1 )( 1 0 2 0 0 0 x x dxxdxdxxfa
- 25. we have Therefore n nxdxxbn 1 sin)( 1 0 1 2 sin 1 cos )1(1 4 )( n n nx n nx n xf
- 26. Expand f(x) = x, −2 < x < 2 in a Fourier series. Solution it is an odd function on (−2, 2) and p = 2. Thus n dxx n xb n n 1 2 0 )1(4 2 sin 1 1 2 sin )1(4 )( n n x n n xf
- 27. Ch12_27 If a function f is defined only on 0 < x < L, we can make arbitrary definition of the function on −L < x < 0. If y = f(x) is defined on 0 < x < L, (i) reflect the graph about the y-axis onto −L < x < 0; the function is now even. See Fig 1. (ii) reflect the graph through the origin onto −L < x < 0; the function is now odd. See Fig 2 (iii) define f on −L < x < 0 by f(x) = f(x + L). See Fig 3
- 28. Fig 1
- 29. Fig 2
- 30. Fig 3
- 31. Expand f(x) = x2, 0 < x < L, (a) in a cosine series, (b) in a sine series (c) in a Fourier series. Solution The graph is shown in Fig
- 34. (c) With p = L/2, n/p = 2n/L, we have Therefore n L xdx L n x L b n L xdx L n x L aLdxx L a L n L n L 2 0 2 22 2 0 22 0 2 0 2 sin 2 2 cos 2 , 3 22 1 2 22 2 sin 12 cos 1 3 )( n x L n n x L n n LL xf Contd……
- 35. http://en.wikipedia.org/wiki/Fourier_series Advance engineering mathematics by : Atul books publication(GTU)