Question

given (e^x)sin3x = Im((e^x)(e^i3x)) Integrate (e^x)sin3x.dx You can just take the imaginary part of... If (e^x)(sin3x)=Im ((e^x)(e^i3x)) integrate (e^x)(sin3x) I get the answer(e^x)(cos3x-3sin3x) +... f(x)=sin3x, find f^(79) and f^(120)? What am I suppose to do? prove that 5x - 7 - sin3x = 0 has at least one zero and prove that it has exactly one real zero.... (cos3x)^2+(sin3x)^2=cos(f(x)) find f(x) (cos3x)^4+(sin3x)^4=cos(g(x)) find g(x) Intergrate sin3x dx sin3x−sinx=0 Solve the equation sin3x+sins=0,for value of x from -180°to180°, inclusive. Please help me solve sin3x=cos(5x+10°)