Advertisements
Advertisements
प्रश्न
If the centroid of a triangle is (1, 4) and two of its vertices are (4, −3) and (−9, 7), then the area of the triangle is
विकल्प
183 sq. units
- \[\frac{183}{2}\] sq. units
366 sq. units
- \[\frac{183}{4}\] sq. units
Advertisements
उत्तर
We have to find the co-ordinates of the third vertex of the given triangle. Let the co-ordinates of the third vertex be ( x , y) .
The co-ordinates of other two vertices are (4,−3) and (−9, 7)
The co-ordinate of the centroid is (1, 4)
We know that the co-ordinates of the centroid of a triangle whose vertices are `(x_1 ,y_1 ) , (x_2,y_2),(x_3,y_3)` is
`((x_1+x_2 +x_3)/3 , (y_1 + y_2+y_3)/3)`
So,
`(1 , 4) = ((x+4-9)/3 , (y-3+7)/3)`
Compare individual terms on both the sides- `(x - 5)/3 = 1`
So,
x = 8
Similarly,
`(y+ 4 )/3 = 4`
So,
y = 8
So the co-ordinate of third vertex is (8, 8)
In general if `A (x_1 , y_1) ;B(x_2 , y_2 ) ;C(x_3 , y_3)` are non-collinear points then are of the triangle formed is given by-,
`ar (Δ ABC ) = 1/2 |x_1(y_2 - y_3 ) +x_2 (y_3 - y_1) + x_3 (y_1 - y_2)|`
So,
`ar (ΔABC ) = 1/2 |4(7-8)-9(8+3)+8(-3-7)|`
`= 1/2 | -4-99-80|`
`= 183/2`
APPEARS IN
संबंधित प्रश्न
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 equation of the perpendicular bisector of the line segment joining points (7, 1) and (3,5).
If three consecutive vertices of a parallelogram are (1, -2), (3, 6) and (5, 10), find its fourth vertex.
If A and B are (1, 4) and (5, 2) respectively, find the coordinates of P when AP/BP = 3/4.
If the points p (x , y) is point equidistant from the points A (5,1)and B ( -1,5) , Prove that 3x=2y
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.
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.
If the point P(k - 1, 2) is equidistant from the points A(3, k) and B(k, 5), find the value of k.
Find the ratio in which the point (−3, k) divides the line-segment joining the points (−5, −4) and (−2, 3). Also find the value of k ?
Points P, Q, R and S divides the line segment joining A(1, 2) and B(6, 7) in 5 equal parts. Find the coordinates of the points P, Q and R.
Find the value(s) of k for which the points (3k − 1, k − 2), (k, k − 7) and (k − 1, −k − 2) are collinear.
If P (2, p) is the mid-point of the line segment joining the points A (6, −5) and B (−2, 11). find the value of p.
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 distance of the point (4, 7) from the y-axis is
The coordinates of the fourth vertex of the rectangle formed by the points (0, 0), (2, 0), (0, 3) are
In Fig. 14.46, the area of ΔABC (in square units) is
Write the X-coordinate and Y-coordinate of point P(– 5, 4)
Point (–10, 0) lies ______.
The points (–5, 2) and (2, –5) lie in the ______.
The perpendicular distance of the point P(3, 4) from the y-axis is ______.
