Resolve `(2x+1)/((x+1)(x-2))` into partial fractions

Resolve (2x+7)/((x+1)(x^(2)+4)) into partial fractions.

Resolve (3x-2)/((x-1)^2(x+1)(x+2)) into partial fractions.

Resolve (2x^(4)+2x^(2)+x+1)/(x(x^(2)+1)^(2)) into partial fractions.

Solve x/(x - 1) - 1/(x + 2) = 1/(x + 2)

f(x)=sqrt((x-1)/(x-2{x})) , where {*} denotes the fractional part.

Let x_(1) , x_(2) , x_(3) be the solution of tan^(-1) ((2x + 1)/(x +1 )) + tan ^(-1) ((2x - 1)/( x -1 )) = 2 tan ^(-1) ( x + 1) " where x_1 2x_(1) + x_(2) + x_(3)^(2) is equal to

The points (x +1, 2), (1, x +2), ((1)/(x+1),(2)/(x+1)) are collinear, then x is equal to

If |x| le 1 , then 2 tan^-1 x + sin^-1 ((2x)/(1+x^2)) is equal to

Given f(x)={{:(3-[cot^(-1)((2x^3-3)/(x^2))], x >0) ,({x^2}cos(e^(1/x)) , x<0):} (where {} and [] denotes the fractional part and the integral part functions respectively). Then which of the following statements do/does not hold good?

Evalute : int(1-x^2)/(x(1-2x))dx