Given a triangle with side `PQ = 8` cm. To get a line segment `PQ' = (3)/(4)` of PQ, we divide the line segment `PQ` in the ratio

Find the ratio in which the line segment PQ P(4, 5) and Q(3,7), is internally divided by the Y-axis.

Draw a line segment of length 7.6 cm and divide it in the ratio 3 : 2 .

If the projection of a line segment PQ on the coordinate axes are 3,4,5, then the length of the line segment is

In the figure, PQ is a tangent to a circle with centre O. QR=RO . If PQ= 3 sqrt(3) cm and ORQ is a line segment, find the radius of the circle.

A straight line through the origin O meets the parallel lines 4x+2y=9 and 2x+y+6=0 at points P and Q respectively. Then the point O divides the segment PQ in the ratio :

Determine the ratio in which the line 2x + y - 4 = 0 divides the line segment joining the points A(2, -2) and B(3, 7).

A line with positive direction cosines passes through the point P (2, - 1, 2) and makes equal angles with the coordinate axes. The line meets the plane 2x + y + z = 9 at point Q. The length of the line segment PQ equals:

In a triangle PQR with right angle at Q , the value of angle P is x, PQ = 7cm and QR = 24 cm , then find sin x and cos x