If ABCD is a tetrahedron such that each `triangleABC, triangleABD and triangleACD` has a right angle at A. If `ar(triangle(ABC))=k_1, ar(triangleABD)=k_2, ar(triangleBCD)=k_3`, then `ar(triangleACD)` is

Let ABCD be a tetrahedron such that the edges AB, AC and AD are mutually perpendicular. Let the area of triangleABC, triangleACD and triangleABD be 3, 4 and5 sq. units, respectively. Then, the area of the triangleBCD . Is

In triangleABC , medians AC, BE and CF intersect at point G. Prove that ar(GAB)=ar(GBC)=ar(GCA)= 1/3 ar(ABC).

Show that the triangle ABC with vertices A(0, 4, 1), B(2, 3, -1) and C(4, 5, 0) is right angled.

In triangleABC , AD is an altitude . If BC=8 cm and ar (ABC)=40 cm^2 , then AD= ______ cm.

In triangleABC , point D lies on side BC. E is the midpoint of AD. Prove that, ar(EBC)= 1/2 ar(ABC)

In a triangle ABC , E is the midpoint of median AD. Show that ar(BED) = 1/4 ar(ABC)

In triangleABC , BC=10 cm and the length of altitude AD is 5 cm. Then , ar(ABC)=….. cm^2 .

In triangleABC , AD is a median . E is the midpoint of AD and F is the midpoint of AE. Prove that ar(ABF)= 1/8 ar(ABC).

ABCD is a parallelogram. If ar (ABC) = 18 cm^(2) , then are (ABCD) = …………….. cm^(2)

In the figure, diagonals AC and BD of a trapezium ABCD with AB || DC intersect each other at O. Prove that ar(DeltaAOD) = ar(Delta BOC).