The volume of the parallelepiped with its edges represented by the vectors `hat(i)+hat(j),hat(i)+2hat(j),hat(i)+hat(j)+pihat(k)` is

Find the volume of the parallelepiped whose coterminous edges are represented by the vector -6hat(i)+14hat(j)+10hat(k),14hat(i)-10hat(j)-6hat(k),and2hat(i)+4hat(j)-2hat(k).

Find the volume of a parallelopiped with coterminous edges represented by the vectors 3 hat i + 4 hat j , 2 hat i + 3 hat j + 4 hat k and 5 hat k .

The volume (in cubic units) of the parallelopiped whose edges are represented by the vectors hat i + hat j , hat j + hat k and hat k + hat i 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 parallelepiped whose coterminus edges are 7hat(i)+lambdahat(j)-3hat(k),hat(i)+2hat(j)-hat(k)-3hat(i)+7hat(j)+5hat(k) is 90 cubic 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 whose sides are given by bar(OA)=2hat(i)-3hat(j),bar(OB)=hat(i)+hat(j)-hat(k)andbar(OC)=3hat(i)-hat(k) is

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