If the curve `C_1: y= lnx/x and C_2: lambda x^2`( where`lambda` is a constant) touches each other,then the value of `lambda` is

If the curves C_1 : y= (In x)/x and C_2 : y=lambdax^2 (where lambda is constant) touches each other, then the value of lambda is

If the curves C_(1):y=(In x)/(x) and C_(2):y=lambda x^(2) (where lambda is constant) touches each other,then the value of lambda is

If the line y=3x+lambda touches the hyperbola 9x^(2)-5y^(2)=45 , then the value of lambda is

If the line y=3x+lambda touches the hyperbola 9x^(2)-5y^(2)=45 , then the value of lambda is

If the roots of the equation (x^(2) -bx)/(ax - c) = (lambda - 1)/(lambda + 1) are such that alpha + beta =0 , then the value of lambda is :

f(x)={[x]+[-x], where x!=2 and lambda where If f(x) is continuous at x=2 then,the value of lambda will be

The integral I=int2^((2^(x)+x))dx=lambda. (2^(2^(x)))+C (where, C is the constant of integration). Then the value of sqrtlambda is equal to

The integral I=int2^((2^(x)+x))dx=lambda. (2^(2^(x)))+C (where, C is the constant of integration). Then the value of sqrtlambda is equal to

The circle x^(2)+y^(2)+4 lambda x=0 which lambda in R touches the parabola y^(2)=8x The value of lambda is given by

If the line y=3 x+lambda touches the hyperbola 9 x^(2)-5 y^(2)=45, then a value of lambda is