`e^(xcosx)`

If y=x^(xcosx) then find (dy)/(dx)

int(dx)/(sqrt(sin^(3)xcosx))=?

Find the following limits: lim_(xrarr0)(e^x-e^(-x))/(xcosx)

intdx/(sin^2xcosx)

Find integral of int e^x.cosx dx

Evaluate : lim_( x -> 0 )(( e^x - e^-x))/( xcosx )

Which of the following is/are correct? Between any two roots of e^xcosx=1, there exists at least one root of tanx=1. Between any two roots of e^xsinx=1, there exists at least one root of tanx=-1. Between any two roots of e^xcosx=1, there exists at least one root of e^xsinx=1. Between any two roots of e^xsinx=1, there exists at least one root of e^xcosx=1.

Which of the following is/are correct? (A) Between any two roots of e^xcosx=1, there exists at least one root of tanx=1. (B) Between any two roots of e^xsinx=1, there exists at least one root of tanx=-1. (C) Between any two roots of e^xcosx=1, there exists at least one root of e^xsinx=1. (D) Between any two roots of e^xsinx=1, there exists at least one root of e^xcosx=1.

Which of the following is/are correct? (A) Between any two roots of e^xcosx=1, there exists at least one root of tanx=1. (B) Between any two roots of e^xsinx=1, there exists at least one root of tanx=-1. (C) Between any two roots of e^xcosx=1, there exists at least one root of e^xsinx=1. (D) Between any two roots of e^xsinx=1, there exists at least one root of e^xcosx=1.

Which of the following is/are correct? (A) Between any two roots of e^xcosx=1, there exists at least one root of tanx=1. (B) Between any two roots of e^xsinx=1, there exists at least one root of tanx=-1. (C) Between any two roots of e^xcosx=1, there exists at least one root of e^xsinx=1. (D) Between any two roots of e^xsinx=1, there exists at least one root of e^xcosx=1.