The slop of the normal to the reactangular hyperbola `xy=c^(2)` point (`x_(1),y_(1))` is -

The slope of the tangent to the rectangular hyperbola xy=c^(2) at the point (ct,(c)/(t)) is -

The slope of the normal to the rectangular hyperbola xy=4 "at" (2t, (2)/(t)) is -

The slope of the normal to the cirlce x^(2)+y^(2)=a^(2) at the point (x_(1),y_(1)) is -

Find the equation of the normal to the hyperbola 3x^(2)-4y^(2)=12 at the point (x_(1),y_(1)) on it. Hence, show that the straight line x+y+7=0 is a normal to the hyperbola. Find the coordinates of the foot of the normal.

If m is the slop of the normal to the continous curve y=f(x) at the point (x_(1),y_(1)) , then m is equal to-

Show that the normal to the rectangular hyperbola xy=c^(2) at point t meet the curve again at t' such that t^(3)t'=1 .

The eqaution of the normal to the continuous curve y=f(x) at the point (x_(1),y_(1)) is-

Find the equation of the normal to the parabola y^(2)=4ax at a point (x_(1),y_(1)) on it. Show that three normal can be drawn to a parabola from an external point.

The slop of the normal to the hyperbola (x^(2))/(a^(2))-(y^(2))/(b^(2))=1 at the point ( a sec theta , b tan theta) is -

Find the equation of normal to the hyperbola x^2-9y^2=7 at point (4, 1).