If `y = mx + c` be a tangent to the hyperbola `x^2/lambda^2-y^2/(lambda^3+lambda^2+lambda)^2 = 1, (lambda!=0),` then minimum value of 16m^2

If the line y=2x+lambda be a tangent to the hyperbola 36x^(2)-25y^(2)=3600 , then lambda is equal to

If the points A(lambda, 2lambda), B(3lambda,3lambda) and C(3,1) are collinear, then lambda=

Let alpha and beta be the values of x obtained form the equation lambda^(2) (x^(2)-x) + 2lambdax +3 =0 and if lambda_(1),lambda_(2) be the two values of lambda for which alpha and beta are connected by the relation alpha/beta + beta/alpha = 4/3 . then find the value of (lambda_(1)^(2))/(lambda_(2)) + (lambda_(2)^(2))/(lambda_(1)) and (lambda_(1)^(2))/lambda_(2)^(2) + (lambda_(2)^(2))/(lambda_(1)^(2))

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

Show that the area of the triangle with vertices (lambda, lambda-2), (lambda+3, lambda) and (lambda+2, lambda+2) is independent of lambda .

A system of equations lambdax +y +z =1,x+lambday+z=lambda, x + y + lambdaz = lambda^2 have no solution then value of lambda is

If f(x)=lambda|sinx|+lambda^2|cosx|+g(lambda) has a period = pi/2 then find the value of lambda

If the ellipse x^(2)+lambda^(2)y^(2)=lambda^(2)a^(2) , lambda^(2) gt1 is confocal with the hyperbola x^(2)-y^(2)=a^(2) , then

2x^2 +2y^2 +4 lambda x+lambda =0 represents a circle for

A line of slope lambda(0 < lambda < 1) touches the parabola y+3x^2=0 at Pdot If S is the focus and M is the foot of the perpendicular of directrix from P , then tan/_M P S equals (a) 2lambda (b) (2lambda)/(-1+lambda^2) (c) (1-lambda^2)/(1+lambda^2) (d) none of these