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

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

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

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

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

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

The equation of the tangent to the circle x^2+y^2=r^2 at (a,b) is ax+by-lambda=0 , where lambda is