Mark two points P and Q. Draw a line through P and Q.
Now how many lines are parallel to PQ, can you draw?

P(0, 3, -2), Q(3, 7, -1) and R(1, -3, -1) are 3 given points. Let L_1 be the line passing through P and Q and L_2 be the line through R and Parallel to the vector V=hat(i)+hat(k) .the perpendicular distance of p from L1 and shortest distance between L1&L2 is.

Take a graph paper, plot the point (2, 4), and draw a line passing through it.Now answer the following questions. How many such lines can be drawn?

Take a graph paper, plot the point (2, 4), and draw a line passing through it.Now answer the following questions. How many linear equations in two variables exist for which (2, 4) is a solution?

Draw a circle with any radius. Draw four tangents at different points. How many more tangets can you draw to this circle ?

Draw a circle of radius 3 cm. Take two point P and Q on one of its extended diameter each at a distance of 7 cm from its centre. Draw tangents to the circle from these two points P and Q.

Consider the equation of line AB is (x)/(2)=(y)/(-3)=(z)/(6) . Through a point P(1, 2, 5) line PN is drawn perendicular to AB and line PQ is drawn parallel to the plane 3x+4y+5z=0 to meet AB is Q. Then,

A(-2, 2, 3) and B(13, -3, 13) and L is a line through A. Q. A point P moves in the space such that 3PA=2PB , then the locus of P is

if three points are collinear , how many circles can be drawn through these points? Now, try to draw a circle passing through these three points.

In triangle ABC, the bisectors of angle B and angle C intersect at I. A line drawn through I and parallel to BC intersects AB at P and AC at Q. Prove that PQ = BP + CQ.