The midpoints of the sides of a triangle along with any of the vertices as the fourth point makes a parallelogram of area equal to
A
`1/2` area `(DeltaABC)`
B
`1/3` area `(DeltaABC)`
C
`1/4` area `(DeltaABC)`
D
area `(DeltaABC)`
Text Solution
Verified by Experts
The correct Answer is:
A
Topper's Solved these Questions
AREAS OF PARALLELOGRAMS AND TRIANGLES
SCIENCE OLYMPIAD FOUNDATION |Exercise Achievers Section (HOTS) |2 Videos
CIRCLES
SCIENCE OLYMPIAD FOUNDATION |Exercise Achievers Section (HOTS) |3 Videos
Similar Questions
Explore conceptually related problems
The mid-point of the sides of triangle along with any of the vertices as the fourth point make a parallelogram of area equal to
The mid points of the sides of a triangle A B C along with any of the vertices as the fourth point make a parallelogram of area equal to: a r\ ( A B C) (b) 1/2a r\ ( A B C) 1/3a r\ ( A B C) (d) 1/4\ a r\ ( A B C)
The midpoints of the sides of a triangle are (3, 4) , (4, 1) and (2, 0) . Find the vertices of the triangle .
The midpoint of two opposite sides of a quadrilateral and the midpoint of the diagonals are the vertices of a parallelogram. Prove that using vectors.
Find the area of the triangle formed by joining the midpoints of the sides of the triangle whose vertices are (0,1),(2,1) and (0,3). Find the ratio of this area to the area of the given triangle.
Find the area of the triangle formed by joining the mid-points of the sides of the triangle whose vertices are (0,-1),(2,1)and (0,3). Find the ratio of this area to the area of the given triangle.
In an equilateral triangle another equilateral triangle is drawn inside joining the mid-points of the sides of given equilateral triangle and the process is continued up to 7 times. What is the ratio of area of fourth triangle to that of seventh triangle ?
SCIENCE OLYMPIAD FOUNDATION -AREAS OF PARALLELOGRAMS AND TRIANGLES -Achievers Section (HOTS)
