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h1. Spring-Mass Harmonic Oscillator in MATLAB

Consider a spring-mass system shown in the figure below.

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\\ [!spring_mass.png|width=350!|^spring_mass.png]\\
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Applying _F = ma_ in the x-direction, we get the following differential equation for the location x(t) of the center of the mass:
{latex} 
\[
m \ddot{x} + k x =0
\]
{latex}
The initial conditions at _t=0_ are 
{latex} 
\[
x(0)=1,
\]
{latex} 
and 
{latex} 
\[
v(0)=\dot{x} ̇(0)=0
\]
{latex} 

The first condition above specifies the initial location _x(0)_ and the second condition, the initial velocity _v(0)_.   

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We'll solve this differential equation numerically, i.e. integrate it in time starting from the initial conditions at t=0, using MATLAB. We'll use Euler's method to perform the numerical integration. We'll also make a plot of the position vs. time and compare it to the analytical solution.
 
[*Go to Step 1: Euler Integration*|SIMULATION:Spring-Mass System - Euler Integration]

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