`x^2/(r^2+r-6)+y^2/(r^2-6r+5)=1` will represent the ellipse if r lies in the interval

x^2/(r^2-r-6)+y^2/(r^2-6r+5)=1 will represent ellipse if r lies in the interval (a).(- oo ,2) (b). (3, oo ) (c). (5, oo ) (d).(1, oo )

(x^(2))/(r^(2)-r-6) +(y^(2))/(r^(2) - 6r + 5) = 1 will represents an ellipse if r lies in the interval _

If (y^2-5y+3)(x ^2+x+1)<2x for all x in R , then find the interval in which y lies.

Let S={(x,y) in R^(2):(y^(2))/(1+r)-(x^(2))/(1-r)=1} , where r ne pm 1 . Then S represents:

If 1/( ^5C_r)+1/( ^6C_r)+1/(~^4C_r) find the value of r.

If the maximum distance of any point on the ellipse x^2+2y^2+2x y=1 from its center is r , then r is equal to

If in a DeltaABC, r_1r_2+r_2r_3+r_3r_1 is equal to (where r_1,r_2,r_3 are the exradii and 2s is the perimeter)

If I is the incenter of Delta ABC and R_(1), R_(2), and R_(3) are, respectively, the radii of the circumcircle of the triangle IBC, ICA, and IAB, then prove that R_(1) R_(2) R_(3) = 2r R^(2)

Let ABC be a triangle with incentre I and inradius r. Let D, E, F be the feet of the perpendiculars from I to the sides BC, CA and AB, respectively, If r_(2)" and "r_(3) are the radii of circles inscribed in the quadrilaterls AFIE, BDIF and CEID respectively, then prove that r_(1)/(r-r_(1))+r_(2)/(r-r_(2))+r_(3)/(r-r_(3))=(r_(1)r_(2)r_(3))/((r-r_(1))(r-r_(2))(r-r_(3)))