Find `e^(ax) cos (bx+c) dx on R , `where a,b,c are real number and `b ne 0` .

Evaluate the integerals. int (dx)/(a ^(2)+ (b+cx)^(2)) on R, where a,b,c are real numbers, c ne 0 and a gt 0.

Evaluate the integerals. int (x^(2))/((a+bx)^(2))dx, x in I sub R\\{-(a)/(b)},where a,b, are real numbers, b ne0.

Evaluate the integerals. int (dx)/(sqrt(a^(2) -(b+cx)^(2)))on {x in R: |b +cx|lt a}. where a,b,c are real nambers c ne 0 and a gt 0.

Consider the system of equations ax + by + cz = 2 bx + cy + az = 2 cx + ay + bz = 2 where a,b,c are real numbers such that a + b + c = 0. Then the system

Evaluate int (1)/(a sin x + b cos x ) dx where a, b in R and a^2+b^(2) ne 0 " on " R.

Evalute : int e^(ax) sin (bx+c) dx , (a, b, c in R, b ne 0) on R.

The differential equation (dy)/(dx) = (1)/(ax + by + c) where a,b,c are all non zero real numbers, is