[" If the points "(2,3)" and "(3,2)" on a parabola "],[" are equidistant from the focus,the slope "],[" of its tangent at vertex is "]

If the points (2,3) and (3,2) on a parabola are equidistant from the focus, then the slope of its tangent at vertex is

If the points (2,3) and (3,2) on a parabola are equidistant from the focus, then the slope of its tangent at vertex is

If the points (2,3) and (3,2) on a parabola are equidistant from the focus, then the slope of its tangent at vertex is

If the points (2,3) and (3,2) on a parabola are equidistant from the focus, then the slope of its tangent at vertex is (a) 1 (b) -1 (c) 0 (d) oo

If the points A (1,3) and B (5,5) lying on a parabola are equidistant from focus, then the slope of the directrix is

If the points A (1,3) and B (5,5) lying on a parabola are equidistant from focus, then the slope of the directrix is

If the points A (1,3) and B (5,5) lying on a parabola are equidistant from focus, then the slope of the directrix is

If the points A (1,3) and B (5,5) lying on a parabola are equidistant from focus, then the slope of the directrix is

Two tangents on a parabola are x-y=0 and x+y=0. S(2,3) is the focus of the parabola. The equation of the tangent at the vertex is

the tangent to a parabola are x-y=0 and x+y=0 If the focus of the parabola is F(2,3) then the equation of tangent at vertex is