If `vecP=hati+2hatj+6hatk` its direction cosines are

If vecP = hati + hatj + hatk , its direction cosines are

If vecr=2hati-3hatj+2hatk find the direction cosines of vector.

Statement1: A component of vector vecb = 4hati + 2hatj + 3hatk in the direction perpendicular to the direction of vector veca = hati + hatj +hatk is hati - hatj Statement 2: A component of vector in the direction of veca = hati + hatj + hatk is 2hati + 2hatj + 2hatk

Find the vector component of vecF=hati+2hatj+2hatk along the direction of vecp=-3hati-4hatj+12hatk in the plane of vecF and vecP ,

If the position vectors of A and B are hati+3hatj-7hatk and 5hati-2hatj+4hatk , then the direction cosine of AB along Y-axis is

(i) Find the unit vector in the direction of veca+vecb if veca=2hati-hatj+2hatk , and vecb=-hati+hatj-hatk (ii) Find the direction ratios and direction cosines of the vector veca=5hati+3hatj-4hatk .

The direction cosines of vector a=3hati+4hatj+5hatk in the direction of positive axis of X, is

Write the direction ratios of the vector r=hati-hatj+2hatk and hence calculate its direction cosines.

Write the direction ratio's of the vector vec a=4hati-2hatj+hatk and hence calculate its direction cosines.

vecP = (2hati - 2hatj +hatk) , then find |vecP|