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Take a look at the integral below. I need to determine $\alpha$. $A$ is actually a function but can be considered as a constant. How can I perform this integration?

$$\int A e^{-\alpha^2 s^2}\, ds = -1$$

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    Note that $\int e^{-s^2/(2\sigma^2)} \, ds = \sigma \sqrt{2\pi}$. So, if we suppose your "constant" $A$ is $-1/(\sigma\sqrt{2})$, then you have $\alpha = 1/(\sigma\sqrt{2})$.2012-02-15
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    Is this over $(-\infty,\infty)$? If so, use the substitution $v=\alpha s$ and refer to the Wikipedia article on the Gaussian integral.2012-02-15
  • 0
    I think it should be over (0,infinity), the constant is N (number of electrons)2012-02-15

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