Find the condition that the three points whose position vectors, `a=ahati+bhatj+chatk,b=hati+chatj and c=-hati-hatj` are collinear.

The points with positivon vectors 60 hati + 3 hatj , 40 hati - 8 hatj and a hati - 52 hatj are collinarar if :

The points with position vectors 10hati+3hatj,12hati-5hatj and ahati+11hatj are collinear, if a is equal to

The points with position vectors 60hati+3hatj,40hati-8hatj, ahati-52hatj are collinear if a=

If the points with position vectors 10 hati + 3 hatj, 12 hati- 5 hatj and lamda hati + 11 hatj are collinear, then lamda is :

If points hati+hatj, hati -hatj and p hati +qhatj+rhatk are collinear, then

Show that the vectors 2hati-3hatj+4hatk and -4hati+6hatj-8hatk are collinear.

The point having position vectors 2hati+3hatj+4hatk,3hati+4hatj+2hatk and 4hati+2hatj+3hatk are the vertices of

Show that the points A,B and C with position vectors , veca=3hati-4hatj-4hatk,vecb=2hati-hatj+hatkandvecc=hati-3hatj=5hatk ,respectively form the vertices of a right angled triangle.

If three points A,B and C are collinear, whose position vectors are hati-2hatj-8hatk,5hati-2hatk and 11hati+3hatj+7hatk respectively, then the ratio in which B divides AC is

Find the positioon vector of a point R which divides the line joining two points P and Q whose position vectors are hati + 2hatj-hatk and -hati + hatj +hatk respectively in the ratio 2 : 1 Internally