" (i) "x=am^(2)" तथा "y=2am

The equation of normal x^(2)=4ay having slope m is x=my-2am-am^(3) x=my-2am-am^(2) x=my+2am-am^(3) y=mx+2a+a/m^(3)

Statement-I : The condition for the line y = mx+c to be a tangent to (x+a)^(2) = 4ay is c = am(1-m). Statement-II : The condition for tbe line y = mx + c to be a focal chord to y^(2) = 4ax is c+am=0 Statement-III : The condition for the line y = mx + c to be a tangent x^(2)=4ay is c = - am^(2) Which of above stattements is true

Statement-I : The condition for the line y = mx+c to be a tangent to (x+a)^(2) = 4ay is c = am(1-m). Statement-II : The condition for tbe line y = mx + c to be a focal chord to y^(2) = 4ax is c+am=0 Statement-III : The condition for the line y = mx + c to be a tangent x^(2)=4ay is c = - am^(2) Which of above stattements is true

The normal to the parabola y^(2)=4ax at P(am_(1)^(2),2am_(1)) intersects it again at Q(am_(2)^(2), 2am_(2)) .If A be the vertex of the parabola then show that the area of the triangle APQ is (2a^(2))/(m_(1))(1+m_(1)^(2))(2+m_(1)^(2)) .

If x=2am, y=2am^(2) where m be the parameter then (dy)/(dx) =?

Find the equation of the normal to the curve ay^(2)=x^(3) at the point (am^(2), am^(3)) .

Find the equation of the normal at the point (am^(2) ,am^(3) ) for the curve ay^(2) = x^( 3) .

Find the equation of the normal at the point (am^(2) ,am^(3) ) for the curve ay^(2) = x^( 3) .

Find the equation of the normal at the point (am^(2) ,am^(3) ) for the curve ay^(2) = x^( 3) .