If ` x_(1) and x_(2)` are the roots of the equation ` e^(2)* x^(In x) = x^(3)` with `x_(1) gt x_(2), ` then

If x_1a n dx_2 are the roots of the equation e^2 x^(lnx)=x^3 with x_1> x_2, then x_1=2x_2 (b) x_1=x2 2 2x_1=x2 2 (d) x1 2=x2 3

The roots of the equation x^(3) -2x^(2) -x +2 =0 are

Find the root of the equation |x-1|^(x^(2)+x-2)=1

If x_(1) and x_(2) are two distind roots of the equation a cos x+b sinx=c , then tan"" (x_(1)+x_(2))/(2) is equal to

The number of roots of the equation, x-(2)/(x-1) is

Let x_(1),x_(2) are the roots of the quadratic equation x^(2) + ax + b=0 , where a,b, are complex numbers and y_(1), y_(2) are the roots of the quadratic equation y^(2) + |a|yy+ |b| = 0 . If |x_(1)| = |x_(2)|=1 , then prove that |y_(1)| = |y_(2)| =1

If x_1 and x_2 are the solutions of the equation x^(log_(10)x)=100x such that x_1gt1 and x_2lt1 , the value of (x_1x_2)/2 is

The roots of the equation (1+isqrt(3))^(x)-2^(x)=0 form

The number of roots of the equation 1+3^(x/2)=2^x is

If x_(1) , x_(2) and x_(3) are the positive roots of the equation x^(3)-6x^(2)+3px-2p=0 , p inR , then the value of sin^(-1)((1)/(x_(1))+(1)/(x_(2)))+cos^(-1)((1)/(x_(2))+(1)/(x_(3)))-tan^(-1)((1)/(x_(3))+(1)/(x_(1))) is equal to