Updated Session 4 day 1 slides.
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%Tutorial slides on Python.
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% Author: FOSSEE
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% Title page
\title[]{Finding Roots}
\author[FOSSEE] {FOSSEE}
\institute[IIT Bombay] {Department of Aerospace Engineering\\IIT Bombay}
\date[] {31, October 2009\\Day 1, Session 6}
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\maketitle
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%% \begin{frame}
%% \frametitle{Outline}
%% \tableofcontents
%% % You might wish to add the option [pausesections]
%% \end{frame}
\begin{frame}[fragile]
\frametitle{Roots of $f(x)=0$}
\begin{itemize}
\item Roots --- values of $x$ satisfying $f(x)=0$
\item $f(x)=0$ may have real or complex roots
\item Presently, let's look at real roots
\end{itemize}
\end{frame}
\begin{frame}[fragile]
\frametitle{Initial Estimates}
\begin{itemize}
\item Find the roots of $cosx-x^2$ between $-\pi/2$ and $\pi/2$
\item We shall use a crude method to get an initial estimate first
\end{itemize}
\begin{enumerate}
\item Check for change of signs of $f(x)$ in the given interval
\item A root lies in the interval where the sign change occurs
\end{enumerate}
\end{frame}
\begin{frame}[fragile]
\frametitle{Initial Estimates \ldots}
\begin{lstlisting}
In []: def our_f(x):
....: return cos(x)-x**2
....:
In []: x = linspace(-pi/2, pi/2, 11)
\end{lstlisting}
\begin{itemize}
\item Get the intervals of x, where sign changes occur
\end{itemize}
\end{frame}
%% \begin{frame}[fragile]
%% \frametitle{Initial Estimates \ldots}
%% \begin{lstlisting}
%% In []: pos = y[:-1]*y[1:] < 0
%% In []: rpos = zeros(x.shape, dtype=bool)
%% In []: rpos[:-1] = pos
%% In []: rpos[1:] += pos
%% In []: rts = x[rpos]
%% \end{lstlisting}
%% \end{frame}
\begin{frame}[fragile]
\frametitle{Fixed Point Method}
\begin{enumerate}
\item Convert $f(x)=0$ to the form $x=g(x)$
\item Start with an initial value of $x$ and iterate successively
\item $x_{n+1}=g(x_n)$ and $x_0$ is our initial guess
\item Iterate until $x_{n+1}-x_n \le tolerance$
\end{enumerate}
\end{frame}
%% \begin{frame}[fragile]
%% \frametitle{Fixed Point \dots}
%% \begin{lstlisting}
%% In []: def our_g(x):
%% ....: return sqrt(cos(x))
%% ....:
%% In []: tolerance = 1e-5
%% In []: while abs(x1-x0)>tolerance:
%% ....: x0 = x1
%% ....: x1 = our_g(x1)
%% ....:
%% In []: x0
%% \end{lstlisting}
%% \end{frame}
\begin{frame}[fragile]
\frametitle{Bisection Method}
\begin{enumerate}
\item Start with an interval $(a, b)$ within which a root exists
\item $f(a)\cdot f(b) < 0$
\item Bisect the interval. $c = \frac{a+b}{2}$
\item Change the interval to $(a, c)$ if $f(a)\cdot f(c) < 0$
\item Else, change the interval to $(c, b)$
\item Go back to 3 until $(b-a) \le$ tolerance
\end{enumerate}
\end{frame}
%% \begin{frame}[fragile]
%% \frametitle{Bisection \dots}
%% \begin{lstlisting}
%% In []: tolerance = 1e-5
%% In []: a = -pi/2
%% In []: b = 0
%% In []: while b-a > tolerance:
%% ....: c = (a+b)/2
%% ....: if our_f(a)*our_f(c) < 0:
%% ....: b = c
%% ....: else:
%% ....: a = c
%% ....:
%% \end{lstlisting}
%% \end{frame}
\begin{frame}[fragile]
\frametitle{Newton Raphson Method}
\begin{enumerate}
\item Start with an initial guess of x for the root
\item $\Delta x = -f(x)/f^{'}(x)$
\item $ x \leftarrow x + \Delta x$
\item Go back to 2 until $|\Delta x| \le$ tolerance
\end{enumerate}
\end{frame}
%% \begin{frame}[fragile]
%% \frametitle{Newton Raphson \dots}
%% \begin{lstlisting}
%% In []: def our_df(x):
%% ....: return -sin(x)-2*x
%% ....:
%% In []: delx = 10*tolerance
%% In []: while delx > tolerance:
%% ....: delx = -our_f(x)/our_df(x)
%% ....: x = x + delx
%% ....:
%% ....:
%% \end{lstlisting}
%% \end{frame}
\begin{frame}[fragile]
\frametitle{Newton Raphson \ldots}
\begin{itemize}
\item What if $f^{'}(x) = 0$?
\item Can you write a better version of the Newton Raphson?
\item What if the differential is not easy to calculate?
\item Look at Secant Method
\end{itemize}
\end{frame}
\begin{frame}[fragile]
\frametitle{Scipy Methods - \typ{roots}}
\begin{itemize}
\item Calculates the roots of polynomials
\item Array of coefficients is the only parameter
\end{itemize}
\begin{lstlisting}
In []: coeffs = [1, 6, 13]
In []: roots(coeffs)
\end{lstlisting}
\end{frame}
\begin{frame}[fragile]
\frametitle{Scipy Methods - \typ{fsolve}}
\begin{small}
\begin{lstlisting}
In []: from scipy.optimize import fsolve
\end{lstlisting}
\end{small}
\begin{itemize}
\item Finds the roots of a system of non-linear equations
\item Input arguments - Function and initial estimate
\item Returns the solution
\end{itemize}
\begin{lstlisting}
In []: fsolve(our_f, -pi/2)
\end{lstlisting}
\end{frame}
\begin{frame}[fragile]
\frametitle{Scipy Methods \dots}
\small{
\begin{lstlisting}
In []: from scipy.optimize import fixed_point
In []: from scipy.optimize import bisect
In []: from scipy.optimize import newton
\end{lstlisting}}
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\end{document}