Find the curve for which the perpendicular from the foot of the ordinate to the tangent is of constant length.

Find the equation of the curve in which the perpendicular from the origin on any tangent is equal to the abscissa of the point of contact.

The curve with the property that the projection of the ordinate on the normal is constant and has a length equal to a is

The curve for which the ratio of the length of the segment intercepted by any tangent on the Y-axis to the length of the radius vector is constant (k), is

There is curve in which the length of the perpendicular from the orgin to tangent at any point is equal to abscissa of that point. Then,

· The co-ordinates of foot of the perpendicular from the point (2, 4) on the line x+y = 1 are:

The locus of the foot of the perpendicular from the centre of the ellipse x^2 +3y^2 =3 on any tangent to it is

The co-ordinates of the point S are (4, 0) and a point P has coordinates (x, y). Express PS^(2) in terms of x and y. Given that M is the foot of the perpendicular from P to the y-axis and that the point P moves so that lengths PS and PM are equal, prove that the locus of P is 8x=y^(2)+16 . Find the co-ordinates of one of the two points on the curve whose distance from S is 20 units.

Find the co-ordinates of the foot of perpendicular drawn from the point (3,-3) to the line x-2y=4 .

Find the length and the foot of the perpendicular from the point (7,14 ,5) to the plane 2x+4y-z=2.

The vertices of a triangle are A (0, 5), B (-1, -2) and C (11, 7). Write down the equations of BC and the perpendicular from A to BC and hence find the co-ordinates of the foot of the perpendicular.