No.4 me of a parallelopiped, whose coterminus edges are given by the vectors j + nk, 6 2ỉ + 49 – nk and < = i +nj + 3ť (n > 0), is 158 cu. 2: 2) T.c=10 3) ā.c=17 4) n=9

If the volume of a parallelopiped ,whose coterminus edges are given by the vectors veca = hati + hatj + nhatk , vecb = 2 hati + 4 hatj - n hatk and vec c = hati + n hatj + 3 hatk ( n ge 0) , is 158 cu. Units , then :

The volume of the parallelopiped whose coterminal edges are 2i - 3j + 4k, I + 2j - 2k, 3i - j + k is

Find the volume of the parallelepiped whose coterminus edges are given by the vectors hat i + 2 hat j + 3 hat k , 2 hat i - hat j - hat k and 3 hat i + 4 hat j + 2 hat k

The volume of the parallelopiped whose edges are given by I + 2j + 3k, 2i + 3j + 2k, 2i + 3j + k is

Let the volume of a parallelopiped whose coterminus edges are given by u = I + j + lambdak, v = I + j + 3k and w = 2i + j + k be 1 cu. unit. If theta be the angle between the edges u and w, then cos theta can be:

Find the volume of the Parallelopiped whose coterminous edges are represented by the vectors 2 hat i+ 3 hat j + 4 hat k,hat i +2 hat j - hat k and 3 hat i -hat j +2 hat k .

The value ( in cubic units ) of the parallelopiped whose coterminus edges are given by the vectors vec(i)-vec(j)+hat(k),2hat(i)-4hat(j)+5hat(k) and 3 hat(i) -5 hat(j) + 2hat(k) is

Find the volume of the parallelopiped, if the coterminus edges are given by the vectors 2hati + 5hatj - 4hatk . 5hati + 7hatj + 5hatk , 4hati + 5hatj - 2hatk

Find the volume of the Parallelopiped whose coterminous edges are represented by the vectors vec a = 2 hat i- 3 hat j + 4 hat k, vec b= hat i +2 hat j- hat k and vec c = 3 hat i -hat j +2 hat k .