A,B C and dD are four points such that v...

A,B C and dD are four points such that `vec (AB) = m(2 hati - 6 hatj + 2hatk) vec(BC) = (ahti - 2hatj) and vec(CD) = n (-6 hati + 15 hatj - 3 hatk)`. If CD intersects AB at some points E, then

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A,B C and dD are four points such that vec (AB) = m(2 hati - 6 hatj + 2hatk) vec(BC) = (hati - 2hatj) and vec(CD) = n (-6 hati + 15 hatj - 3 hatk) . If CD intersects AB at some points E, then

If vec(a) = hati - 2hatj - 3hatk, vec(b) = 2 hati - hatj - hatk and vec(c) = hati +3 hatj - 2hatk find (vec(a) xx vec(b)) xx vec(c)

Find the angle between the vectors vec(A) = 2 hati - 4hatj +6 hatk and vec(B) = 3 hati + hatj +2hatk .

If vec(a) = hati - 2hatj - 3hatk, vec(b) = 2hati +hatj - hatk and vec(c) = hati +3hatj - 2hatk then find vec(a) xx (vec(b) xx vec(c)) .

Find the angle between the vertors vec(A) = hati + 2hatj - hatk and vec(B) = - hati +hatj - 2hatk .

Find the area of the triangle formed by the tips of the vectors vec(a) = hati - hatj - 3hatk, vec(b) = 4hati - 3hatj +hatk and vec(c) = 3 hati - hatj +2 hatk .

A,B C and dD are four points such that `vec (AB) = m(2 hati - 6 hatj + 2hatk) vec(BC) = (ahti - 2hatj) and vec(CD) = n (-6 hati + 15 hatj - 3 hatk)`. If CD intersects AB at some points E, then

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