The number of perpendicular that can be drawn from a point not on the line are

Statement I two perpendicular normals can be drawn from the point (5/2,-2) to the parabola (y+1)^2=2(x-1) . Statement II two perpendicular normals can be drawn from the point (3a,0) to the parabola y^2=4ax .

Find the equation of a line passing through the points A(0, 6, -9) and B(-3,-6,3). If D is the foot of the perpendicular drawn from a point C(7,4,-1) on the line AB, then find the coordinates of the point D and the equation of line CD.

There are 10 points in a plane of which no three points are collinear and four points are concyclic. The number of different circles that can be drawn through at least three points of these points is

The number of straight lines that can be drawn out of 10 points of which 7 are collinear is :

Find the product of the perpendiculars drawn from the point (x_1,y_1) on the lines ax^2+2hxy+by^2=0

Find the equations of the perpendicular drawn from the point (2,4,-1) to the line : (x+5)/1=(y+3)/4=(z-6)/-9

The length of the perpendicular drawn from the point (3, -1, 11) to the line (x)/(2)=(y-2)/(3)=(z-3)/(4) is

Find the length of perpendicular drawn from the point (3,4,5) on the line (x-2)/(2)=(y-3)/(5)=(z-1)/(3) Also find the foot of perpendicular.

Find the equation of the perpendicular drawn from the point P(2,4,-1) to the line : (x+5)/1=(y+3)/4=(z-6)/-9 . Also write down the co ordinates of the foot of the perpendicualr from P to the line.

Of all the line-segments that can be drawn from a point to a line not containing it, the perpendicular line-segment is the shortest.