The distance between the line `vecr = 2 hati - 2 hatj + 3 hatk + lamda ( hati - hatj + 4 hatk) ` and the plane `vecr. (hati + 5 hatj + hatk) = 5` is

The distance between the line vecr = 2hati - 2hatj + 3hatk + lambda (hati-hatj + 4hatk) and the plane vecr. (hati + 5hatj + hatk) = 5 is

The line through hati + 3 hatj + 2 hatk and bot to the line vecr = (hati + 2 hatj - hatk) + lamda ( 2 hati + hatj + hatk) and (2 hati + 6 hatj + hatk) + mu ( hati + 2 hatj + 3 hatk) is

The angle between two vectors 6 hati + 6 hatj- 3hatk and 7 hati + 4 hatj + 4hatk is given by

find vecA xx vecB if vecA = hati - 2 hatj + 4 hatk and vecB = 3 hati - hatj + 2hatk

The ratio in which the line segment joining the points whose position vectors are 2 hati - 4 hatj - 7 hatk and - 3 hati + 5 hatj - 8 hatk is divided by the plane whose equation is vec r.(hati -2 hatj + 3hatk) =13 is

Let P (3,2,6) be a point in space and Q be point on the line vecr = (hati - hatj + 2 hatk) + mu ( - 3 hati + hatj + 5 hatk). Then the value of mu for which we vector vec (PQ) is parallel to the pplane x - 4y + 3z =1 is

If the planes vecr.(hati + hatj + hatk) = q _(1) , hatr. (hati + 2 a hatj + hatk) = q _(2) and vecr.(ahati + a ^(2) hatj + hatk) = q _(3) intersect in a line, then the value of a is

The equation of the plane passing through a point with position vector hati + 2 hatj + 3 hatk and parallel to the plane vecr. (3 hati + 4 hatj + 5 hatk)=0 is

IF the vectors a = hati + hatj + hatk , b = hati - hatj + 2 hatk and c= x hati +(x-2) hatj - hatk are coplanar , then x=