Prove that the line `y = x - 1` cannot be a normal of the hyperbola `x^(2) - y^(2) = 1` .

Find the condition that line lx + my - n = 0 will be a normal to the hyperbola x^(2)/a^(2) - y^(2)/b^(2) = 1 .

Show that there cannot be any common tangent to the hyperbola x^(2)/a^(2) - y^(2)/b^(2) = 1 and its conjugate hyperbola.

If the line y = mx + 7 sqrt(3) is normal to the hyperbola (x^(2))/(24)-(y^(2))/(18)=1 , then a value of m is :

The line y = 4x + c touches the hyperbola x^(2) - y^(2) = 1 if

Show that the line y=2x-4 is a tangent to the hyperbola (x^(2))/(16)-(y^(2))/(48)=1. Find its point of contact.

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

The coordinates of the point at which the line 3x+4y=7 is a normal to the hyperbola (x^(2))/(a^(2))-(y^(2))/(b^(2))=1, are

Statement 1: The line x-y-5=0 cannot be normal to the parabola (5x-15)^(2)+(5y+10)^(2)=(3x-4y+2)^(2) Statement 2: Normal to parabola never passes through its focus.