The focal chord to `y^2=16 x` is tangent to `(x-6)^2+y^2=2.` Then the possible value of the slope of this chord is `{-1,1}` (b) `{-2,2}` `{-2,1/2}` (d) `{2,-1/2}`

The focal chord to y^(2)=16x is tangent to (x-6)^(2)+y^(2)=2 then the possible values of the slope of this chord

The focal chord to y^(2)=16x is tangent to (x-6)^(2)+y^(2)=2, then the possible values of the slope of this chord are: (a) {-1,1} (b) {-2,2}(c){-2,(1)/(2)}(d){2,-(1)/(2)}

The focal chord of y^(2)=16x is tangent to (x-6)^(2)+y^(2)=2 . Then the possible value of the square of slope of this chord is __________ .

The focal chord of y^(2)=64x is tangent to (x-4)^(2)+(y-2)^(2)=4 , th en the square root of the length of this focal chord is equal to

Classroom Study Package 1718 The focal chord to y':16x is tangent to (x-6)2+y2=2 then the possible values of th this chord,are e slope of (A)1(C)1(B)2(D)2 InICAL RASED TYPE

One extremity of a focal chord of y^(2)=16x is A(1,4). Then the length of the focal chord at A is

Let one end of focal chord of parabola y^2 = 8x is (1/2, -2) , then equation of tangent at other end of this focal chord is