Show that L {t^x.e^at} = n!/(p-a)^n+1 , p > a?

or:Show that L {t^x.e^at} = n!/(p-a)^n+1 , p > a?or:I have studied some very esoteric math systems, but I have no idea what you are trying to present

or:Show that L {t^x.e^at} = n!/(p-a)^n+1 , p > a?

or:I have studied some very esoteric math systems, but I have no idea what you are trying to present. I don't even know what all the symbols mean. You are going to have to explain this question before you get an answer.

or:It isn't. How would euler's number relate to an integer factorial, what are all these haphazard parameters whose set definitions aren't even provided. The entire statement appears to be an arbitrary & poor fabrication.

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