Let a circle `x^(2) + y^(2) + 2gx + 2fy + k = 0 ` cuts a rectangular hyperbola `xy = c^(2)` in `(ct_(1), c/t_(1)) , (ct_(2), c/t_(2)) , (ct_(3), c/t_(3)) " and " (ct_(4), c/t_(4))` .

The equation ax^(2)+2hxy+by^(2)+2gx+2fy+c=0 repersents a rectangular hyperbola if

The parabola y^(2)=4x cuts orthogonally the rectangular hyperbola xy=c^(2) then c^(2)=

If a circle and the rectangular hyperbola xy = c^(2) meet in four points 't'_(1) , 't'_(2) , 't'_(3) " and " 't'_(4) then prove that t_(1) t_(2) t_(3) t_(4) = 1 .

If the normal to the rectangular hyperbola xy = 4 at the point (2t, (2)/(t_(1))) meets the curve again at (2t_(2), (2)/(t_(2))) , then

A variable circle whose centre lies on y^(2)-36=0 cuts rectangular hyperbola xy=16 at (4t_(i),(4)/(t_(i)))ei=1,2,3,4 then sum_(i=1)^(4)((1)/(t_(i))) can be

If the circle x^(2)+y^(2)+2gx+2fy+c=0 touches x- axis at (x_(1),0) then x^(2)+2gx+c =

The equation of tangent to the curve xy=c^(2) at (ct, (c )/(t)) is

If a circle intersects the parabola y^(2) = 4ax at points A(at_(1)^(2), 2at_(1)), B(at_(2)^(2), 2at_(2)), C(at_(3)^(2), 2at_(3)), D(at_(4)^(2), 2at_(4)), then t_(1) + t_(2) + t_(3) + t_(4) is

If (2,-1) lies on x^(2) + y^(2) + 2gx + 2fy + c = 0 , which is concentric with x^(2) + y^(2) + 4x - 6y + 3 = 0 , then c =

If the normal to the rectangular hyperbola xy=c^(2) at the point t' meets the curve again at t_(1) then t^(3)t_(1), has the value equal to