If G and L are the greatest and least values of the expression `(x^(2)-x+1)/(x^(2)+x+1), x epsilon R` respectively then
`G` and `L` are the roots of the equation

If G and L are the greatest and least values of the expression (2x^(2)-3x+2)/(2x^(2)+3x+2), x in R respectively. G and L are the roots of the equation

If G and L are the greatest and least values of the expression (x^(2)-x+1)/(x^(2)+x+1), x epsilon R respectively. then find the least value of G^(5)+L^(5) .

If G and L are the greatest and least values of the expression (2x^(2)-3x+2)/(2x^(2)+3x+2), x in R respectively. The least value of G^(100)+L^(100) is

If G and L are the greatest and least values of the expression (2x^(2)-3x+2)/(2x^(2)+3x+2), x in R respectively. If L^(2)ltlamdaltG^(2), lamda in N the sum of all values of lamda is

The greatest and least value of (sin^(-1)x)^2 + (cos^(-1) x)^2 are respectively :

The minimum value of the expression 3x+ 3^(1-x) , x in R , is :

Roots of the equation x^(2) -2x+ 1 =0 are :

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

The greatest value of : f(x) =cos[x e^([x])+7x^(2)-3x], x in [-1, oo) is :

If m and n are the roots of the equations x^(2) - 6x+ 2 =0 then the value of (1)/(m) + (1)/( n) is :