Advertisements
Advertisements
प्रश्न
If the line segment joining the points (3, −4), and (1, 2) is trisected at points P (a, −2) and Q \[\left( \frac{5}{3}, b \right)\] , Then,
पर्याय
- \[a = \frac{8}{3}, b = \frac{2}{3}\]
- \[a = \frac{7}{3}, b = 0\]
- \[a = \frac{1}{3}, b = 1\]
- \[a = \frac{2}{3}, b = \frac{1}{3}\]
Advertisements
उत्तर
We have two points A (3,−4) and B (1, 2). There are two points P (a,−2) and Q `(5/3,b)`which trisect the line segment joining A and B.
Now according to the section formula if any point P divides a line segment joining `A(x_1 ,y_1)" and B "(x_2 , y_2) ` in the ratio m: n internally than,
`P ( x , y ) = ((nx_1 + mx_2) /(m+n) , (ny_1 + my_2) /(m+n) )`
The point P is the point of trisection of the line segment AB. So, P divides AB in the ratio 1: 2
Now we will use section formula to find the co-ordinates of unknown point A as,`
`p( a , -2) = ((2(3) + 1 (1) )/(1+2) , (2(-4)+1(2))/(1+2))`
` = (7/3,-2)`
Equate the individual terms on both the sides. We get,
`a = 7/3`
Similarly, the point Q is the point of trisection of the line segment AB. So, Q divides AB in the ratio 2: 1
Now we will use section formula to find the co-ordinates of unknown point A as,
`Q (5/3 , b) = ((2(1)+1(3))/(1+2) , (2(2) + 1(-4))/(1+2))`
`= (5/3 , 0)`
Equate the individual terms on both the sides. We get,
b = 0
APPEARS IN
संबंधित प्रश्न
A line intersects the y-axis and x-axis at the points P and Q respectively. If (2, –5) is the mid-point of PQ, then find the coordinates of P and Q.
Show that the points (−3, 2), (−5,−5), (2, −3) and (4, 4) are the vertices of a rhombus. Find the area of this rhombus.
If the point A (4,3) and B ( x,5) lies on a circle with the centre o (2,3) . Find the value of x.
Show that the points A(3,0), B(4,5), C(-1,4) and D(-2,-1) are the vertices of a rhombus. Find its area.
Show that the following points are the vertices of a rectangle.
A (2, -2), B(14,10), C(11,13) and D(-1,1)
The midpoint P of the line segment joining points A(-10, 4) and B(-2, 0) lies on the line segment joining the points C(-9, -4) and D(-4, y). Find the ratio in which P divides CD. Also, find the value of y.
Prove that the diagonals of a rectangle ABCD with vertices A(2,-1), B(5,-1) C(5,6) and D(2,6) are equal and bisect each other
ΔXYZ ∼ ΔPYR; In ΔXYZ, ∠Y = 60o, XY = 4.5 cm, YZ = 5.1 cm and XYPY =` 4/7` Construct ΔXYZ and ΔPYR.
Show that the points (−4, −1), (−2, −4) (4, 0) and (2, 3) are the vertices points of a rectangle.
If R (x, y) is a point on the line segment joining the points P (a, b) and Q (b, a), then prove that x + y = a + b.
If three points (x1, y1) (x2, y2), (x3, y3) lie on the same line, prove that \[\frac{y_2 - y_3}{x_2 x_3} + \frac{y_3 - y_1}{x_3 x_1} + \frac{y_1 - y_2}{x_1 x_2} = 0\]
If the points A(−1, −4), B(b, c) and C(5, −1) are collinear and 2b + c = 4, find the values of b and c.
Write the coordinates the reflections of points (3, 5) in X and Y -axes.
Find the values of x for which the distance between the point P(2, −3), and Q (x, 5) is 10.
If the centroid of the triangle formed by the points (a, b), (b, c) and (c, a) is at the origin, then a3 + b3 + c3 =
In the above figure, seg PA, seg QB and RC are perpendicular to seg AC. From the information given in the figure, prove that: `1/x + 1/y = 1/z`
Point P(– 4, 2) lies on the line segment joining the points A(– 4, 6) and B(– 4, – 6).
The coordinates of a point whose ordinate is `-1/2` and abscissa is 1 are `-1/2, 1`.
If the coordinate of point A on the number line is –1 and that of point B is 6, then find d(A, B).
In which ratio the y-axis divides the line segment joining the points (5, – 6) and (–1, – 4)?
