Product of perpendiculars from the foci of `x^(2)/4-y^(2)/9=1" to "y=mx+sqrt(4m^2- 9)` where `m gt 3/2` is

Statement-I : The distance of the normal to x^(2) + 2y^(2) = 5 at (1,sqrt(2)) from origin is 1/3sqrt(2) . Statement-II : The product of the perpendiculars from the foci of the ellipse (x^(2))/(7)+(y^(2))/(4)=1 to any tangent is 7. Statement-III: The distance between the foci of (x^(2))/(25)+(y^(2))/(36)=1 is 2sqrt(11) . The Statements that are correct are :

If the product of perpendiculars from (k,k) to the pair of lines x^2+4xy+3y^2=0 is 4sqrt5 then k is

The product of the perpendiculars from the foci on any tangent to the ellipse x^(2)//a^(2)+y^(2)//b^(2)=1 is

The product of perpendiculars from origin to the pair of lines 2x^(2)+5xy+3y^(2)+6x+7y+4=0 is

The product of the perpendicular from the foci on any tangent to the hyperbola x^(2) //a^(2) -y^(2) //b^(2) =1 is

If the product of the perpendicular distances from (1, k) to the pair of lines x^(2)-4xy+y^(2)=0 is (3)/(2) units, then k=

Prove that the product of the perpendicular from the foci on any tangent to the ellips (x^(2))/(a^(2))+(y^(2))/(b^(2)) =1 is equal to b^(2)

The product of the perpendicular distances from (1, -1) to the pair of lines x^(2)-4xy+y^(2)=0 , is

Find the product of lengths of the perpendiculars from any point on the hyperbola (x^(2))/(16)-(y^(2))/(9)=1 to its asymptotes.

Show that product of lengths of the perpendicular from any point on the hyperbola x^(2)/(16)-y^(2)/(9)=1 to its asymptotes is (144)/(25) .