Advertisements
Advertisements
Question
If the points A (1,2) , O (0,0) and C (a,b) are collinear , then find a : b.
Advertisements
Solution
For the three points `(x_1,y_1) , (x_2 , y_2) " and " (x_3,y_3)` to be collinear we need to have area enclosed between the points equal to zero.
Here, points `(x_1,y_1) , (x_2 , y_2) " and " (x_3,y_3)` are
\[ \Rightarrow - b + 2a = 0\]
\[ \Rightarrow 2a = b\]
\[ \Rightarrow \frac{a}{b} = \frac{1}{2}\]
RELATED QUESTIONS
Let ABCD be a square of side 2a. Find the coordinates of the vertices of this square when A coincides with the origin and AB and AD are along OX and OY respectively.
Find the coordinates of the point which divides the line segment joining (−1,3) and (4, −7) internally in the ratio 3 : 4
Find the points of trisection of the line segment joining the points:
5, −6 and (−7, 5),
Show that the following points are the vertices of a square:
A (6,2), B(2,1), C(1,5) and D(5,6)
Find the co-ordinates of the point which divides the join of A(-5, 11) and B(4,-7) in the ratio 7 : 2
Points P, Q, R and S divide the line segment joining the points A(1,2) and B(6,7) in five equal parts. Find the coordinates of the points P,Q and R
Find the ratio in which the pint (-3, k) divide the join of A(-5, -4) and B(-2, 3),Also, find the value of k.
Find the area of the triangle formed by joining the midpoints of the sides of the triangle whose vertices are A(2,1) B(4,3) and C(2,5)
Find the coordinates of the circumcentre of a triangle whose vertices are (–3, 1), (0, –2) and (1, 3).
Two points having same abscissae but different ordinate lie on
If the point \[C \left( - 1, 2 \right)\] divides internally the line segment joining the points A (2, 5) and B( x, y ) in the ratio 3 : 4 , find the value of x2 + y2 .
Write the condition of collinearity of points (x1, y1), (x2, y2) and (x3, y3).
The distance between the points (a cos 25°, 0) and (0, a cos 65°) is
The area of the triangle formed by (a, b + c), (b, c + a) and (c, a + b)
If P is a point on x-axis such that its distance from the origin is 3 units, then the coordinates of a point Q on OY such that OP = OQ, are
The ratio in which the line segment joining points A (a1, b1) and B (a2, b2) is divided by y-axis is
Find the coordinates of the point of intersection of the graph of the equation x = 2 and y = – 3
Assertion (A): The ratio in which the line segment joining (2, -3) and (5, 6) internally divided by x-axis is 1:2.
Reason (R): as formula for the internal division is `((mx_2 + nx_1)/(m + n) , (my_2 + ny_1)/(m + n))`
Co-ordinates of origin are ______.
Distance of the point (6, 5) from the y-axis is ______.
