Question: Following function is important in applied mathematics and physics (probability theory and statistics, thermodynamics, etc.) and fits our present discussion. Regarding it as a typical
Following function is important in applied mathematics and physics (probability theory and statistics, thermodynamics, etc.) and fits our present discussion.
Regarding it as a typical case of a special function defined by an integral that cannot be evaluated as in elementary calculus, do the following.
Show that erf x is odd. Show that
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ANSWER To show that erf x is odd we need to show that erfx erfx Lets start with the definition of er... View full answer
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