Math Is Fun Forum

hi bobbym,
thanks foo the help.
you mentioned that there are others solution.
could you please provide me the other, because z=0 is not a good solution in my model.
Moreover, the complex values are also not a good solution. since my model is only for real values.

oh, thanks a lot
you are amazing.
i'll consider these solution and i think to find root for y i have to substitute x value in one of the equation  in post #1.

Thanks for the answer. it helps a lot and i tried to solved it using cubic formula. I searched for the cubic formula  (http://en.wikipedia.org/wiki/Cubic_formula#General_formula_of_roots). I found that there are some restriction (limitation or may say conditions) that gives different solution which I really did not understand it.
could you explain to me little bit please or any suggestion about solution using cubic formula.

Hi Bobbym,
thanks for this long explanation.
based on what i understood and i realized that it is better to use the solution that you suggested (post #4).

It is really helps a lot and i noticed that especially after your explanation.

thanks again.

abotaha.

Hi guys,

The above integrals can be expressed in terms of the Euler gamma function:

and suppose

then

Then, use the rules:

the problem now is that the boundaries of the integral after some transformation steps are changed such that start from constant to infinity as:

so when i expressed the last integral in terms of the Euler gamma function I got:

observe the lower integral boundary is constant (c).
is there any transformation to make the low boundary zero in order to apply Gamma function formula, or is there any method to deal with this case?

Thanks bobbym for the response.
I have did the following simplification and the real bound value of the integration is from 0 to infinity:

and I separate that into three integrals:

Right now the integration seems to be simply, but it is still not easy for me to do it.
I need help please .