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
How will you describe the position of a table lamp on your study table to another person?
If A(–2, 1), B(a, 0), C(4, b) and D(1, 2) are the vertices of a parallelogram ABCD, find the values of a and b. Hence find the lengths of its sides
Prove that (4, 3), (6, 4) (5, 6) and (3, 5) are the angular points of a square.
The line joining the points (2, 1) and (5, −8) is trisected at the points P and Q. If point P lies on the line 2x − y + k = 0. Find the value of k.
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, and R in that order are dividing line segment joining A (1,6) and B(5, -2) in four equal parts. Find the coordinates of P, Q and R.
In what ratio does the line x - y - 2 = 0 divide the line segment joining the points A (3, 1) and B (8, 9)?
The base BC of an equilateral triangle ABC lies on y-axis. The coordinates of point C are (0, −3). The origin is the midpoint of the base. Find the coordinates of the points A and B. Also, find the coordinates of another point D such that ABCD is a rhombus.
Find the value of a, so that the point ( 3,a ) lies on the line represented by 2x - 3y =5 .
The measure of the angle between the coordinate axes is
If P ( 9a -2 , - b) divides the line segment joining A (3a + 1 , - 3 ) and B (8a, 5) in the ratio 3 : 1 , find the values of a and b .
\[A\left( 6, 1 \right) , B(8, 2) \text{ and } C(9, 4)\] are three vertices of a parallelogram ABCD . If E is the mid-point of DC , find the area of \[∆\] ADE.
Write the condition of collinearity of points (x1, y1), (x2, y2) and (x3, y3).
If A (1, 2) B (4, 3) and C (6, 6) are the three vertices of a parallelogram ABCD, find the coordinates of fourth vertex D.
If A (2, 2), B (−4, −4) and C (5, −8) are the vertices of a triangle, than the length of the median through vertex C is
The area of the triangle formed by (a, b + c), (b, c + a) and (c, a + b)
If P(2, 4), Q(0, 3), R(3, 6) and S(5, y) are the vertices of a parallelogram PQRS, then the value of y is
Any point on the line y = x is of the form ______.
Which of the points P(-1, 1), Q(3, - 4), R(1, -1), S (-2, -3), T(-4, 4) lie in the fourth quadrant?
If the sum of X-coordinates of the vertices of a triangle is 12 and the sum of Y-coordinates is 9, then the coordinates of centroid are ______.
