If three points A,B and C have position vectors (1,x,3),(3,4,7) and (y,-2,-5), respectively and if they are collinear, then find (x,y).

If three points A,B and C have p.v.s.(1,2,3),(3,4,x) and (-3,y,-5) respectively and if they are collinear then (x,y)=

Show that the points A,B and C having position vectors (i+2j+7k),(2i+6j+3k) and (3i+10j-k) respectively,are collinear.

If the points A,B,C and D have position vectors bara,2bara+barb,4bara+2barb and 5 bara+4barb respectively, then three collinear points are

If three points A,B, and C have position vectors hat i+xhat j+3hat k,3hat i-4hat j+7hat k and yhat i-2hat j-5hat j respectively are collinear,them (x,y)=(2,-3) b.(-2,3) c.(-2,-3) d.(2,3)

the three points with position vectors (1,a,b);(a,2,b) and (a,b,3) are collinear in space,then the value of a+b is

The points A,B and C with position vectors 3 hati - y hatj + 2hatk, 5 hati - hatj + hatk and 3x hati+ 3 hatj- hatk are collinear. Find the values of x and y and also the ratio in which the point B divides AC.

If the points (x,y) ,(1,2) and ( -3,4) are collinear, then

If three points A, B and C have position vectors hati + x hatj + 3 hatk, 3 hati + 4 hatj + 7 hatk and y hati -2hatj - 5 hatk respectively are collinear, then (x, y) =