Let `hata and hatb ` be mutually perpendicular unit vectors. Then for ant arbitrary `vecr`.

If a,b,c are mutually perpendicular unit vectors then |a+b+c|=

hata and hatb are two mutually perpendicular unit vectors. If the vectors xhata+xhatb+z(hataxxhatb),hata+(hataxxhatb) and zhata+zhatb+y(hataxxhatb) lie in a plane, then z is

Let veca and vecb be two mutually perpendicular unit vectors and vecc be a unit vector inclned at an angle theta to both veca and vecb . If vecc=xveca+xvecb+y(vecaxxvecb) , where x,yepsilonR , then the exhaustive range of theta is

Let veca, vecb and vecc are three mutually perpendicular unit vectors and a unit vector vecr satisfying the equation (vecb -vecc)xx(vecr xx veca)+(vecc -veca)xx(vecr xx vecb)+(veca-vecb)xx(vecr xx vecc)=0, then vecr is

If veca and vecb are mutually perpendicular unit vectors, vecr is a vector satisfying vecr.veca =0, vecr.vecb=1 and (vecr veca vecb)=1 , then vecr is:

Assertion: Thevalue of expression hati(hatjxxhatk)+hatj.(hatkxxhati)+hatk.(hatixxhatj) is equal to 3, Reason: If hata, hatb, hatc are mutually perpendicular unit vectors, then [hata hatb hatc]=1 (A) Both A and R are true and R is the correct explanation of A (B) Both A and R are true R is not te correct explanation of A (C) A is true but R is false. (D) A is false but R is true.

For mutually perpendicular unit vectors hat(i), hat(j), hat(k) , we have :

If vec a and vec b are mutually perpendicular unit vectors,write the value of |vec a+vec b+vec c|