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

ABCD is a tetrahedron such that each of the triangleABC , triangleABD and triangleACD has a right angle at A. If ar(triangleABC) = k_(1). Ar(triangleABD)= k_(2), ar(triangleBCD)=k_(3) then ar(triangleACD) is

If the medians of a triangle ABC intersect at G, show that ar(triangleAGB)=ar(triangleAGC)=ar(triangleBGC) =(1)/(3)ar(triangleABC) .

In triangleABC , if R/r le 2 , and a=2, then triangle is equal to (triangle=ar(triangleABC)) .

If triangleABC ~ triangleDEF, ar(triangleDEF) =100cm^(2) and (AB)/(DE)=1/2," then ar(DABC) is"

If triangle ABC - triangle PQR and (BC)/(QR) = 1/4 then (ar(trianglePQR))/(ar(triangleABC)) =

In triangleABC, angleB=60^(@) and angleC = 75^(@) . If D is a point on side BC such that ("ar"(triangleABD))/("ar"(triangleACD))=1/sqrt(3) find angleBAD

In a triangle ABC, E is the mid-point of median AD. Show that ar (triangleBED)=1/4 ar( triangleABC ).

ABCD is a parallelogram and O is a point in its interior. Prove that (i) ar(triangleAOB)+ar(triangleCOD) =(1)/(2)ar("||gm ABCD"). (ii) ar(triangleAOB)+ar(triangleCOD)=ar(triangleAOD)+ar(triangleBOC) .

In triangleABC , P is the mid-point of BC and Q is the mid-point of AP. Find the ratio of the area of triangleABQ and the area of angleABC . The following are the steps involved in solving the above problem. A) We know that a a median of a triangle divides a triangle into two triangles of equal area. B) rArr Ar(triangleABP) =1/2[Ar(triangleABC)] C) Ar(triangleABQ)=1/2[Ar(triangleABP)]=1/4[Ar(triangleABC)] D) rArr(triangleABQ):Ar(triangleABC)=1:4