The equation `(x^(2))/(10-lambda)+(y^(2))/(6-lambda)=1` represents

The equation (x^(2))/(2-lambda)+(y^(2))/(lambda-5)-1=0 represents an ellipse if

The equation (x^(2))/(10-a)+(y^(2))/(4-a)=1 represents an ellipse if

The eqaution x^(2)+(lambda+mu)xy+lambdamuy^(2)+x+muy =0 represent two parallel straight lines if

The differential equation satisfying the curve (x^(2))/(a^(2)+lambda)+(y^(2))/(b^(2)+lambda)=1 where lambda be arbitary uknown, is (a) (x+yy_(1))(xy_(1)-y)=(a^(2)-b^(2))y_(1) (b) (x+yy_(1))(xy_(1)-y)=y_(1) ( c ) (x-yy_(1))(xy_(1)+y)(a^(2)-b^(2))y_(1) (d) None of these

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 :

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

The equation (x-x_(1))(x-x_(2))+(y-y_(1))(y-y_(2))=0 represents a circle whose centre is

Show that the equation (10x-5)^(2)+(10y-5)^(2)=(3x+4y-1)^(2) represents an ellipse, find the eccentricity of the ellipse.

The equation x^(2)-3 x y+lambda y^(2)+3 x-5 y+2=0 , whose lambda is a real number, represents a pair of lines. If theta is the angle between the lines then operatorname(cosec)^(2) theta=

If the equation lambda x^(2)-5 x y+6 y^(2)+x-3 y=0 represents a pair of lines, then their point of intersection is