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प्रश्न
Find the ratio in which the point (-1, y) lying on the line segment joining points A(-3, 10) and (6, -8) divides it. Also, find the value of y.
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उत्तर १
Let k be the ratio in which P(-1,y ) divides the line segment joining the points
A(-3,10) and B (6,-8)
Then ,
`(-1,y ) = ((k(6) -3)/(k+1) , (k(-8)+10)/(k+1) )`
`⇒(k(6) -3 )/(k+1) = -1 and y = (k(-8)+10)/(k+1)`
`⇒ k = 2/7`
`"Substituting " k=2/7 "in" y = (k(-8)+10)/(k+1) `, we get
`y =((-8xx2)/(7)+10)/(2/7 +1) = (-16+70)/9 = 6`
Hence, the required ratio is 2 : 7 and y=6
उत्तर २
Suppose P(−1, y) divides the line segment joining A(−3, 10) and B(6 −8) in the ratio k : 1.
Using section formula, we get
Coordinates of P = \[\left( \frac{6k - 3}{k + 1}, \frac{- 8k + 10}{k + 1} \right)\]
\[\therefore \left( \frac{6k - 3}{k + 1}, \frac{- 8k + 10}{k + 1} \right) = \left( - 1, y \right)\]
\[\Rightarrow \frac{6k - 3}{k + 1} = - 1\] and \[y = \frac{- 8k + 10}{k + 1}\]
Now,
\[\frac{6k - 3}{k + 1} = - 1\]
\[ \Rightarrow 6k - 3 = - k - 1\]
\[ \Rightarrow 7k = 2\]
\[ \Rightarrow k = \frac{2}{7}\]
So, P divides the line segment AB in the ratio 2 : 7.
Putting k = \[\frac{2}{7}\] in \[y = \frac{- 8k + 10}{k + 1}\] , we get
\[y = \frac{- 8 \times \frac{2}{7} + 10}{\frac{2}{7} + 1} = \frac{- 16 + 70}{2 + 7} = \frac{54}{9} = 6\]
Hence, the value of y is 6.
संबंधित प्रश्न
Find the distance between the following pair of points:
(a, 0) and (0, b)
Find the value of x such that PQ = QR where the coordinates of P, Q and R are (6, -1), (1, 3) and (x, 8) respectively.
Find the coordinates of the point where the diagonals of the parallelogram formed by joining the points (-2, -1), (1, 0), (4, 3) and(1, 2) meet
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 ratio in which the line segment joining the points A (3, 8) and B (–9, 3) is divided by the Y– axis.
If `P(a/2,4)`is the mid-point of the line-segment joining the points A (−6, 5) and B(−2, 3), then the value of a is
If the points P, Q(x, 7), R, S(6, y) in this order divide the line segment joining A(2, p) and B(7, 10) in 5 equal parts, find x, y and p.
Show that A (−3, 2), B (−5, −5), C (2,−3), and D (4, 4) are the vertices of a rhombus.
In \[∆\] ABC , the coordinates of vertex A are (0, - 1) and D (1,0) and E(0,10) respectively the mid-points of the sides AB and AC . If F is the mid-points of the side BC , find the area of \[∆\] DEF.
If the point P (m, 3) lies on the line segment joining the points \[A\left( - \frac{2}{5}, 6 \right)\] and B (2, 8), find the value of m.
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.
If the distance between points (x, 0) and (0, 3) is 5, what are the values of x?
What is the area of the triangle formed by the points O (0, 0), A (6, 0) and B (0, 4)?
Find the values of x for which the distance between the point P(2, −3), and Q (x, 5) is 10.
If the distance between the points (3, 0) and (0, y) is 5 units and y is positive. then what is the value of y?
Write the X-coordinate and Y-coordinate of point P(– 5, 4)
Which of the points P(0, 3), Q(1, 0), R(0, –1), S(–5, 0), T(1, 2) do not lie on the x-axis?
In which ratio the y-axis divides the line segment joining the points (5, – 6) and (–1, – 4)?
Assertion (A): Mid-point of a line segment divides the line segment in the ratio 1 : 1
Reason (R): The ratio in which the point (−3, k) divides the line segment joining the points (− 5, 4) and (− 2, 3) is 1 : 2.
