The volume of a parallelopiped whose edges are `(-12hati+lambdahatk),(3hatj-hatk)` and `(2hati+hatj-15hatk)` is 546 cubic units. Find the value of `lambda`

The volume of the parallelopiped whose edges are -12hati+lambda hatk,3hatj-hatk and 2hati+hatj-15hatk is 546 cubie units. Find the value of 'lambda' .

The volume of the parallelepiped whose edges are represented by -12 hati + lambda hat k , 3 hat j - hat k , 2hat I + hatj - 15 hat k is 546 cubic units. Find the value of lambda

The volume of the parallelepiped with edges -12hati+alpha hatk,3hatj-hatk and 2hati+hatj-15hatk is 546 then alpha = ……………

The volume of the parallelepiped whose edges are veca=2hati-3hatj+4hatk, vecb=hati+2hatj-hatk and vecc=2hati-hatj+2hatk is

The volume of the parallelepiped whose edges are veca=2hati-3hatj+4hatk, vecb=hati+2hatj-hatk and vecc=2hati-hatj+2hatk is

Find the volume of the parallelopiped whose terminal edges are hati-2hatj+hatk,2hati-3hatj+hatk" and "3hati+hatj-2hatk .

The volume of the parallelopied, whose edge are represented by - 12 hati + alpha, hatk, 3 hatj - hatk 2 hati + hatj - 15 hatk, is 546, then alpha is :

The valume of the parallelopiped whose coterminous edges are hati-hatj+hatk,2hati-4hatj+5hatk and 3hati-5hatj+2hatk , is

If the volume of parallelopiped with conterminus edges 4hati+5hatj+hatk, -hatj+hatk and 3hati+9hatj+phatk is 34 cubic units then p is equal to