Recent content by IsomaDan

And just to be clear. The A_0 has t as their exponent. It is not a subscript!

Actually it is not that large (N, that is), it is just that it varies a lot from case to case and hence I have written it as a sum. Thanks so much for the response. I will try to see if it gets me any further!

Thanks for the reponse. That is the t'th observation of I. They have no well-defined relation to t. In other words; just a bunch of numbers.

Dear everyone. First of all Merry Xmas, when everybody gets to that. I have a problem solving for a factor within a sum. My formula looks as follows: T = Æ© It * A0t The sum runs from t=1 to N, and the aim is to solve for A0, but all my calculations end up extremely messy...

I do know that, my problem however, is it impossible to integrate the function as it stands there. best Dan

Find the integral, and insert the "restriction", to find the constant!

Dear MFB. Thanks so much for your answers. That's much appreciated. Well, with regards to your answer, I suppose (but do not know) I evaluate the definte integral of dp(x,y)/dx = (e^-x^2), with the bounds being an arbitrary constant and set it equal to zero? Is that correct, or am I still far...

I meant satisfies "x ≥ y ≥ 0". Don't know where that went. Sorry for that. All the best Jonas

Homework Statement The function, p(x;y), of two variables is defined for x>y>0, and satisfies We furthermore know that dp(x,y)/dx = (e^-x^2) and that p(y; y) = 0Homework Equations I now need to write p(x,y) as a definite integral of the form int (f(t)dt, with lower bound t=H and upper bound...

The function, p(x;y), of two variables is defined for x>y>0, and satisfies We furthermore know that dp(x,y)/dx = (e^-x^2) and that p(y; y) = 0 I now need to write p(x,y) as a definite integral of the form int (f(t)dt, with lower bound t=H and upper bound x. I suppose I need the info...