A particle is moving in a circular path. The acceleration and moment of the particle at a certain moment are `a=(4 hat(i)+3hat(j))m//s^(2) and p=(8 hat(i)-6hat(j))"kg-m/s"`. The motion of the particle is

Find a unit vector perpendicular to both the vectors (2hat(i)+3hat(j)+hat(k)) and (hat(i)-hat(j)-2hat(k)) .

Find the angle between vec(P) = - 2hat(i) +3 hat(j) +hat(k) and vec(Q) = hat(i) +2hat(j) - 4hat(k)

A ring rotates about z axis as shown in figure. The plane of rotation is xy. At a certain instant the acceleration of a particle P (shown in figure) on the ring is (6hat(i)-8hat(j)) m//s^(2) . Find the angular acceleration of the ring & the abgular velocity at that instant. Radius of the ring is 2m.

Find the components of vector vec(a)=3hat(i)+4hat(j) along the direction of vectors hat(i)+hat(j) & hat(i)-hat(j)

If the position vector of the vertices of a triangle are hat(i)-hat(j)+2hat(k), 2hat(i)+hat(j)+hat(k) & 3hat(i)-hat(j)+2hat(k) , then find the area of the triangle.

If the position vectors of the point A and B are 3hat(i)+hat(j)+2hat(k) and hat(i)-2hat(j)-4hat(k) respectively. Then the equation of the plane through B and perpendicular to AB is

Equation of the plane that contains the lines r=(hat(i)+hat(j))+lambda(hat(i)+2hat(j)-hat(k)) and , r=(hat(i)+hat(j))+mu(-hat(i)+hat(j)-2hat(k)) is

A uniform force of ( 3hat(i)+hat(j)) N acts on an particle of mass 2 kg . Hence the particle is displaced from position (2hat(i)+hat(k)) m to position (4hat(i)+3hat(j)-hat(k)) m . The work done by the force on the particle is

The unit vactor parallel to the resultant of the vectors vec(A)=4hat(i)+3hat(j)+6hat(k) and vec(B)=-hat(i)+3hat(j)-8hat(k) is :-

Angle between the vectors vec(a)=-hat(i)+2hat(j)+hat(k) and vec(b)=xhat(i)+hat(j)+(x+1)hat(k)