Solving Common Variations of the Gaussian Integral
<p>We will begin with perhaps the most basic variation on the Gaussian integral:</p>
<p>Where <em>a</em> > 0.</p>
<p>While the method for solving this integral will be the exact same as the standard Gaussian integral, I wanted to cover this since I will be using the result for the other integrals.</p>
<p>All we have to do is use the same polar coordinates method as before, but make use of the <em>u</em>-substitution of <em>u </em>= -<em>ar</em>² instead of <em>u</em> = -<em>r</em>²:</p>
<p><a href="https://medium.com/@2305sakake/solving-common-variations-of-the-gaussian-integral-659ec5101414"><strong>Read More</strong></a></p>