Question

(0, 0), A(1, 1), B(0, 3) are the vertices of a triangle OAB.divides OB in the ratio 1 : 2, Q is the mid-point of AP, R divides AB in the ratio 2 : 1

1:- If 

Solution

Correct option is

P(0, 1),   

SIMILAR QUESTIONS

Q1

If O is the origin and An is the point with coordinates (n, n + 1) then (OA1)2 + (OA2)2 + …. + (OA7)2 is equal to

Q2

A(a + 1, a – 1), B(a2 + 1, a2 – 1) and C(a3 + 1, a3 – 1) are given points D(11, 9) is the mid-point of AB and E(41, 39) is the mid-point of BC. If F is the mid-point of AC the (BF)2 is equal to

Q3

Given two points A(–2, 0), and B(0,4),  is a point with coordinates (x, x), x ≥ 0P divides the joint A and B in the ratio 2 : 1. C and D are the mid-point of BM and MA respectively

1:- Area of the ΔAMB is minimum, if the coordinates of M are

Q4

Given two points A(-2, 0) and B(0, 4), M is a point with coordinates (xx), x  0. P divides the joint A and B in the ratio 2 : 1 . C and D are the mid-points of BM and AM respectively. Find the perimeter of the quadrilateral ABCD. Find the ratio of the areas of the triangles APM and BPM .

Q5

Given two points A(-2, 0) and B(0, 4), M is a point with coordinates (xx), x  0. P divides the joint A and B in the ratio 2 : 1 . C and D are the mid-points of BM and AM respectively. Find the perimeter of the quadrilateral ABCD.

Q6

Given two points A(-2, 0) and B(0, 4), M is a point with coordinates (xx), x  0. P divides the joint A and B in the ratio 2 : 1 . C and D are the mid-points of BM and AM respectively. Find the perimeter of the quadrilateral ABCD. Find the area of the quadrilateral ABCD in units.

Q7

A(p, 0), B(4, 0), C(5, 6) and D(1, 4) are the vertices of a quadrilateral ABCD If  is obtuse, the maximum integral value of p is

Q8

The value of p for which  is obtuse and  is a right angle is

Q9

A(p, 0), B(4, 0), C(5, 6) and D(1, 4) are the vertices of a quadrilateral ABCD 

If two sides of the quadrilateral are equal; area of the quadrilateral is

Q10

(0, 0), A(1, 1), B(0, 3) are the vertices of a triangle OAB.divides OB in the ratio 1 : 2, Q is the mid-point of AP, R divides AB in the ratio 2 : 1

area of ΔPQR : area of ΔOAB is