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The Road to Reality Study Notes: Difference between revisions

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== Chapter 4 ==
== Chapter 4 ==


Penrose introduced the complex numbers, extending addition, subtraction, multiplication, and division of the reals to the system obtained by adjoining $i$, the square root of -1. Polynomial equations can be solved by complex numbers, this property is called ''algebraic closure'' and follows from the Fundamental Theorem of Algebra. Complex numbers can be visualized graphically as a plane, where the horizontal coordinate gives the real coordinate of the number and the vertical coordinate gives the imaginary part. This helps understand the behavior of power series; for example, the power series $1-x^2+x^4+\cdots$ converges to the function $1/(1+x²)$ only when $|x|<1$, despite the fact that the function doesn't seem to have "singular" behavior anywhere on the real line. This is explained by singularities at $x=i,-i$.  
Penrose introduced the complex numbers, extending addition, subtraction, multiplication, and division of the reals to the system obtained by adjoining i, the square root of -1. Polynomial equations can be solved by complex numbers, this property is called ''algebraic closure'' and follows from the Fundamental Theorem of Algebra. Complex numbers can be visualized graphically as a plane, where the horizontal coordinate gives the real coordinate of the number and the vertical coordinate gives the imaginary part. This helps understand the behavior of power series; for example, the power series  
$$1-x^2+x^4+\cdots$$
converges to the function $1/(1+x²)$ only when $|x|<1$, despite the fact that the function doesn't seem to have "singular" behavior anywhere on the real line. This is explained by singularities at $x=i,-i$.  


Finally, the Mandelbrot set is defined as the set of all points c in the complex plane so that repeated applications of the transformation mapping $z$ to $z^2+c$, starting with $z=0$, do not escape to infinity.
Finally, the Mandelbrot set is defined as the set of all points c in the complex plane so that repeated applications of the transformation mapping $z$ to $z^2+c$, starting with $z=0$, do not escape to infinity.
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