[" The value of 'a'so that the volume of parallelepiped formed by "],[" by "hat i+ahat j+hat k,hat j+ahat k" and "ahat i+hat k" becomes minimum is "]

Find the value of a so that the volume of the parallelepiped formed by vectors hat i+ahat j+k,hat j+ahat k and ahat i+hat k becomes minimum.

Find the value of a so that the volume of the parallelepiped formed by vectors hat i+a hat j+k , hat j+a hat k and a hat i+ hat k becomes minimum.

The value of a so that the volume of parallelepiped formed by hat i+a hat j+ hat k , hat j+a hat k and a hat i+ hat k is minimum is a. -3 b. 3 c. 1//sqrt(3) d. sqrt(3)

The value of a so that the volume of parallelepiped formed by hat i+a hat j+ hat k , hat j+a hat k and a hat i+ hat k is minimum is a. -3 b. 3 c. 1//sqrt(3) d. sqrt(3)

The value of a so that the volume of parallelepiped formed by hat i+ahat j+hat k,hat j+ahat k and ahat i+hat k is minimum is -3 b.3 c.1/sqrt(3)d.sqrt(3)

Find the value of a so that the volume of the parallelepiped formed by vectors hat i+a hat j+k , hat j+a hat ka n da hat i+ hat k becomes minimum.

Find the value of a so that the volume of the parallelepiped formed by vectors hat i+a hat j+k , hat j+a hat ka n da hat i+ hat k becomes minimum.

(a.hat i ) hat i + ( a. hat j) hat j + (a.hat k) hat k =

Find the value of a so that the angle between the two vectors hat i+hat k and hat i-hat j+ahat k may be (pi)/(3) radians.