Final answer:
To evaluate the integral of p(x)e^x^4 dx using substitution, p(x) should be chosen such that it allows for the substitution u = x^4. p(x) could be 4x^3 or a constant multiple of x^3 to facilitate this process.
Step-by-step explanation:
To solve the integral of p(x)ex^4 dx using substitution, we need to choose a substitution that simplifies the integral. A suitable substitution here is u = x4, with du = 4x^3.dx. The function p(x) should simplify this relationship such that when we replace x^3 with a term from p(x), the resulting expression allows for an easy substitution, turning the integral into one involving just e^u and du.
Therefore, an appropriate expression for p(x) would be one that includes the term 4x^3 or something directly proportional to it. For example, if we let p(x) = 4x^3 or p(x) = Cx^3 where C is a constant, then after factorizing we would obtain a new integral of the form Ceudu which would be straightforward to integrate using substitution.