Advertisements
Advertisements
Question
If the vertices of a triangle are (1, −3), (4, p) and (−9, 7) and its area is 15 sq. units, find the value(s) of p.
Advertisements
Solution
Let A(1, −3), B(4, p) and C(−9, 7) be the vertices of the ∆ABC.
Here, x1 = 1, y1 = −3; x2 = 4, y2 = p and x3 = −9, y3 = 7
ar(∆ABC) = 15 square units
\[\Rightarrow \frac{1}{2}\left| x_1 \left( y_2 - y_3 \right) + x_2 \left( y_3 - y_1 \right) + x_3 \left( y_1 - y_2 \right) \right| = 15\]
\[ \Rightarrow \frac{1}{2}\left| 1\left( p - 7 \right) + 4\left[ 7 - \left( - 3 \right) \right] + \left( - 9 \right)\left( - 3 - p \right) \right| = 15\]
\[ \Rightarrow \frac{1}{2}\left| p - 7 + 40 + 27 + 9p \right| = 15\]
\[ \Rightarrow \left| 10p + 60 \right| = 30\]
\[\Rightarrow 10p + 60 = 30\] or \[10p + 60 = - 30\]
\[\Rightarrow 10p = - 30\] or \[10p = - 90\]
\[\Rightarrow p = - 3\] or \[p = - 9\]
Hence, the value of p is −3 or −9.
APPEARS IN
RELATED QUESTIONS
Let ABCD be a square of side 2a. Find the coordinates of the vertices of this square when The centre of the square is at the origin and coordinate axes are parallel to the sides AB and AD respectively.
Find the ratio in which the point (2, y) divides the line segment joining the points A (-2,2) and B (3, 7). Also, find the value of y.
If the points p (x , y) is point equidistant from the points A (5,1)and B ( -1,5) , Prove that 3x=2y
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.
In what ratio does the point P(2,5) divide the join of A (8,2) and B(-6, 9)?
The co-ordinates of point A and B are 4 and -8 respectively. Find d(A, B).
The perpendicular distance of the point P (4, 3) from x-axis is
If A(3, y) is equidistant from points P(8, −3) and Q(7, 6), find the value of y and find the distance AQ.
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.
Two vertices of a triangle have coordinates (−8, 7) and (9, 4) . If the centroid of the triangle is at the origin, what are the coordinates of the third vertex?
Write the formula for the area of the triangle having its vertices at (x1, y1), (x2, y2) and (x3, y3).
Find the values of x for which the distance between the point P(2, −3), and Q (x, 5) is 10.
What is the distance between the points A (c, 0) and B (0, −c)?
What is the distance between the points \[A\left( \sin\theta - \cos\theta, 0 \right)\] and \[B\left( 0, \sin\theta + \cos\theta \right)\] ?
Write the X-coordinate and Y-coordinate of point P(– 5, 4)
Seg AB is parallel to X-axis and coordinates of the point A are (1, 3), then the coordinates of the point B can be ______.
A tiling or tessellation of a flat surface is the covering of a plane using one or more geometric shapes, called tiles, with no overlaps and no gaps. Historically, tessellations were used in ancient Rome and in Islamic art. You may find tessellation patterns on floors, walls, paintings etc. Shown below is a tiled floor in the archaeological Museum of Seville, made using squares, triangles and hexagons.
A craftsman thought of making a floor pattern after being inspired by the above design. To ensure accuracy in his work, he made the pattern on the Cartesian plane. He used regular octagons, squares and triangles for his floor tessellation pattern
Use the above figure to answer the questions that follow:
- What is the length of the line segment joining points B and F?
- The centre ‘Z’ of the figure will be the point of intersection of the diagonals of quadrilateral WXOP. Then what are the coordinates of Z?
- What are the coordinates of the point on y-axis equidistant from A and G?
OR
What is the area of Trapezium AFGH?
Co-ordinates of origin are ______.
The coordinates of the point where the line 2y = 4x + 5 crosses x-axis is ______.
Distance of the point (6, 5) from the y-axis is ______.
