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Impossible, Imaginary, Useful Complex Numbers By:Daniel Fulton Eleventeen Seventy-twelve.

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Presentation on theme: "Impossible, Imaginary, Useful Complex Numbers By:Daniel Fulton Eleventeen Seventy-twelve."— Presentation transcript:

1 Impossible, Imaginary, Useful Complex Numbers By:Daniel Fulton Eleventeen Seventy-twelve

2 Where did the idea of imaginary numbers come from Descartes, who contributed the term "imaginary" Euler called sqrt(-1) = i Who uses them Why are they so useful in REAL world problems

3 Remember Cardanos cubic x 3 + cx + d = 0

4 Finding imaginary answers

5 Inseparable Pairs Complex numbers always appear as pairs in solution Polynomials cant have solutions with only one complex solution

6 Imaginary answers to a problem originally meant there was no solution As Cardano had stated is either +3 or –3, for a plus [times a plus] or a minus times a minus yields a plus. Therefore is neither +3 or –3 but in some recondite third sort of thing. Leibniz said that complex numbers were a sort of amphibian, halfway between existence and nonexistence.

7 Descartes pointed out To find the intersection of a circle and a line Use quadratic equation Which leads to imaginary numbers Creates the term imaginary

8 Wallis draws a clear picture

9 Again lets look at We got So Is There A Real Solution to this equation

10 But Wait This Cant Be True I say let us try x = 4

11 Thank Heavens For Bombelli He used plus of minus for adding a square root of a negative number, which finally gave us a way to work with these imaginary numbers. He showed

12 The Amazing The Wonderful Euler Relation

13 Useful complex

14 Learning to add and multiply again 1.Adding or subtracting complex numbers involves adding/subtracting like terms. (3 - 2i) + (1 + 3i) = 4 + 1i = 4 + i (4 + 5i) - (2 - 4i) = 2 + 9i (Don't forget subtracting a negative is adding!) 2.Multiply: Treat complex numbers like binomials, use the FOIL method, but simplify i 2. (3 + 2i)(2 - i) = (3 2) + (3 -i) + (2i 2) + (2i -i) = 6 - 3i + 4i - 2i 2 = 6 + i - 2(-1) = 8 + i

15 Imaginary to an Imaginary is 1 1 i i i 2 e i 2 2 e i 2 e 0.2078.

16 Why are complex numbers so useful Differential Equations To find solutions to polynomials Electromagnetism Electronics(inductance and capacitance)

17 So who uses them Engineers Physicists Mathematicians Any career that uses differential equations

18 Timeline Brahmagupta writes Khandakhadyaka665 Solves quadratic equations and allows for the possibility of negative solutions. Girolamo Cardanos the Great Art1545 General solution to cubic equations Rafael Bombelli publishes Algebra1572 Uses these square roots of negative numbers Descartes coins the term "imaginary1637 John Wallis1673 Shows a way to represent complex numbers geometrically. Euler publishes Introductio in analysin infinitorum1748 Infinite series formulations of e x, sin(x) and cos(x), and deducing the formula, e ix = cos(x) + i sin(x) Euler makes up the symbol i for 1777 The memoirs of Augustin-Louis Cauchy1814 Gives the first clear theory of functions of a complex variable. De Morgan writes Trigonometry and Double Algebra1830 Relates the rules of real numbers and complex numbers Hamilton 1833 Introduces a formal algebra of real number couples using rules which mirror the algebra of complex numbers Hamilton's Theory of Algebraic Couples 1835 Algebra of complex numbers as number pairs (x + iy)

19 References (Photograph of Thinker by Auguste Rodin http://www.clemusart.com/explore/work.asp?searchText=thinker&recNo=1&tab=2&display= http://www.clemusart.com/explore/work.asp?searchText=thinker&recNo=1&tab=2&display http://history.hyperjeff.net/hypercomplex.html http://mathworld.wolfram.com/ComplexNumber.html (Wallis picture)http://mathworld.wolfram.com/ComplexNumber.html Nahin, Paul. An Imaginary Tale Princeton, NJ: Princeton University Press,1998 Maxur, Barry. Imagining Numbers. New York:Farrar Straus Giroux, 2003 Berlinghoff, William and Gouvea, Fernando. Math through the Ages. Maine: Oxton House Publishers, 2002 Katz, Victor. A History of Mathematics. New York: Pearson, 2004


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