Let veca,vecb,vecc be three vectors such...

Let `veca,vecb,vecc` be three vectors such that `|veca|=|vecb|=|vecc|=4` and angle between `veca and vecb is pi/3` angle between `vecb and vecc` is `pi/3` and angle between `vecc and veca` is `pi/3`. The volume of the parallelopiped whose adjacent edges are represented by the vectors `veca, vecb and vecc` is (A) `24sqrt(2)` (B) `24sqrt(3)` (C) `32sqrt92)` (D) `32sqrt()`

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Let veca,vecb,vecc be three vectors such that |veca|=|vecb|=|vecc|=4 and angle between veca and vecb is pi/3 angle between vecb and vecc is pi/3 and angle between vecc and veca is pi/3 . The heighat of the parallelopiped whose adjacent edges are represented by the ectors veca,vecb and vecc is (A) 4sqrt(2/3) (B) 3sqrt(2/3) (C) 4sqrt(3/2) (D) 3sqrt(3/2)

Let veca,vecb,vecc be three vectors such that |veca|=|vecb|=|vecc|=4 and angle between veca and vecb is pi/3 angle between vecb and vecc is pi/3 and angle between vecc and veca is pi/3 . The volume of the triangular prism whose adjacent edges are represented by the vectors veca,vecb and vecc is (A) 12sqrt(12) (B) 12sqrt(3) (C) 16sqrt(2) (D) 16sqrt(3)

Let veca,vecb,vecc be three vectors such that |veca|=|vecb|=|vecc|=4 and angle between veca and vecb is pi/3 angle between vecb and vecc is pi/3 and angle between vecc and veca is pi/3 . The volume of the tetrhedron whose adjacent edges are represented by the vectors veca,vecb and vecc is (A) (4sqrt(3))/2 (B) (8sqrt(2))/3 (C) 16/sqrt(3) (D) (16sqrt(2))/3

Let vea, vecb and vecc be unit vectors such that veca.vecb=0 = veca.vecc . It the angle between vecb and vecc is pi/6 then find veca .

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