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Complex numbers org.ppt
- 2. PRESENTATION BY OSAMA TAHIR 09-EE-88
- 4. COMPLEX NUMBERS A complex number is a number consisting of a Real and Imaginary part. It can be written in the form i 1
- 5. COMPLEX NUMBERS Why complex numbers are introduced??? Equations like x2=-1 do not have a solution within the real numbers x 1 2 x 1 i 1 i 1 2
- 6. COMPLEX CONJUGATE The COMPLEX CONJUGATE of a complex number z = x + iy, denoted by z* , is given by z* = x – iy The Modulus or absolute value is defined by z x y 2 2
- 7. COMPLEX NUMBERS Real numbers and imaginary numbers are subsets of the set of complex numbers. Real Numbers Imaginary Numbers Complex Numbers
- 8. COMPLEX NUMBERS Equal complex numbers Two complex numbers are equal if their real parts are equal and their imaginary parts are equal. If a + bi = c + di, then a = c and b = d
- 9. ADDITION OF COMPLEX NUMBERS (a bi) (c di) (a c) (b d )i Imaginary Axis z2 EXAMPLE z sum z1 (2 3i ) (1 5i ) z2 (2 1) (3 5)i Real Axis 3 8i
- 10. SUBTRACTION OF COMPLEX NUMBERS (a bi) (c di) (a c) (b d )i Imaginary Axis Example z1 z 2 ( 2 3i ) (1 5i ) z2 z diff ( 2 1) (3 5)i z 2 Real Axis 1 2i
- 11. MULTIPLICATION OF COMPLEX NUMBERS (a bi)(c di) (ac bd) (ad bc)i Example ( 2 3i )(1 5i ) ( 2 15) (10 3)i 13 13i
- 12. DIVISION OF A COMPLEX NUMBERS a bi a bi c di c di c di c di ac adi bci bdi 2 c d 2 2 ac bd bc ad i c d 2 2
- 13. EXAMPLE 6 7i 6 7i 1 2i 1 2i 1 2i 1 2i 6 12i 7i 14i 2 6 14 5i 12 2 2 1 4 20 5i 20 5i 4i 5 5 5
- 14. COMPLEX PLANE A complex number can be plotted on a plane with two perpendicular coordinate axes The horizontal x-axis, called the real axis The vertical y-axis, called the imaginary axis y P x-y plane is known as the z = x + iy complex plane. O x The complex plane Slide 14
- 15. COMPLEX PLANE Geometrically, |z| is the distance of the point z from the origin while θ is the directed angle from the positive x- axis to OP in the above figure. y t an1 x θ is called the argument of z and is denoted by arg z. Thus, Im P y y arg z tan 1 z0 z = x + iy x r |z |= θ O x Re
- 16. Expressing Complex Number in Polar Form x r cos y r sin So any complex number, x + iy, can be written in polar form: x yi r cos r sin i
- 17. Imaginary axis Real axis
- 18. De Moivre’s Theorem De Moivre's Theorem is the theorem which shows us how to take complex numbers to any power easily. Let r(cos F+isin F) be a complex number and n be any real number. Then [r(cos F+isin F]n = rn(cosnF+isin nF) [r(cos F+isin F]n = rn(cosnF+isin nF)
- 19. Euler Formula The polar form of a complex number can be rewritten as z r (cos j sin ) x jy re j This leads to the complex exponential function : z x jy e z e x jy e x e jy e x cos y j sin y
- 20. Example A complex number, z = 1 - j has a magnitude | z | (12 12 ) 2 1 and argument : z tan 2n 2n rad 1 1 4 Hence its principal argument is : Arg z rad 4 Hence in polar form : j z 2e 4 2 cos j sin 4 4
- 21. APPLICATIONS Complex numbers has a wide range of applications in Science, Engineering, Statistics etc. Applied mathematics Solving diff eqs with function of complex roots Cauchy's integral formula Calculus of residues In Electric circuits to solve electric circuits
- 22. How complex numbers can be applied to “The Real World”??? Examples of the application of complex numbers: 1) Electric field and magnetic field. 2) Application in ohms law. 3) In the root locus method, it is especially important whether the poles and zeros are in the left or right half planes 4) A complex number could be used to represent the position of an object in a two dimensional plane,
- 23. REFERENCES.. Wikipedia.com Howstuffworks.com Advanced Engineering Mathematics Complex Analysis
- 25. THANK YOU FOR YOUR ATTENTION..!