Variable constant?

1. The problem statement, all variables and given/known data
Does the term variable constant make sense?
There could also be an integration variable.

i.e in a function W(x) = int(e^(xy)) where y is the integration variable. So is x in this situation the constant variable? Or is the word constant unnecessary.

But in W(x)=x, x would be just be the variable.
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 Recognitions: Gold Member Science Advisor Staff Emeritus No, the term "constant variable" makes no sense. Nor does it apply to the situation you cite. x could be a constant or it could be a variable exy is being integrated with respect to b. I.e. at each value of x.
 you mean wrt y? So W(x)=int(e^xy)dy but x is still a variable. Just like in W(x)=x. Do you think functions like W(x)=int(e^xy)dy is strange? Where or how does it appear usually?

Mentor

Variable constant?

$$W(x) = \int_{y_1}^{y_2} f(x,y)\,dy$$

doesn't seem that strange to me. The integrand is a function of two variables, but when you integrate over y, the y-dependence is eliminated, and what remains is a function of x only. Integration wrt y just gives you a number (in this case, a different number FOR EACH value of x). So what remains is a function of x.