The position vector of a particle of mas...

The position vector of a particle of mass m= 6kg is given as `vec(r)=[(3t^(2)-6t) hat(i)+(-4t^(3)) hat(j)] m`. Find:
(i) The force `(vec(F)=mvec(a))` acting on the particle.
(ii) The torque `(vec(tau)=vec(r)xxvec(F))` with respect to the origin, acting on the particle.
(iii) The momentum `(vec(p)=mvec(v))` of the particle.
(iv) The angular momentum `(vec(L)=vec(r)xxvec(p))` of the particle with respect to the origin.

Text Solution

Verified by Experts

The correct Answer is:

(i) `36hat(i)-144 t hat(j)` (ii) `(-288 t^(3)+864 t^(2)) hat(k)` (iii) `(36t-36)hat(i)-72 t^(2) hat(j)` (iv) `-72 t^(4)+288 t^(3)hat(k)`

`vecv=(dvecr)/(dt)=(6t-6)hati+(-12t^2)hatj m//s`
`a=(dvecr)/(dt)=(6t-24tjatj)m//s^2`
(i)`vecF=mveca=6(6hati-24hatj)=(36hati-144thatj)N`
(ii)`vectau=vecrxxvecF=[(3t^2-6t)hati+(-4t^3)hatj]xx[36hati-144thatj]`
`=[(-144xx3t^2)+(144xx6t^2)+144t^3]hatk`
`=(-288t^3+864t^2)hatk`
(iii)`vecp=mvecv=6[(6t-6)hati+(-12t^2)hatj]`
`[36(t-1)hati-72t^2hatj]`
(iv)`vecL=vecrxxvecp=[(3t^2-6t)hati+(-4t^3)hatj]xx[36(t-1)hati-72t^2hatj]`
`=[-72t^4+288t^3]hatk`

Topper's Solved these Questions

MISCELLANEOUS
ALLEN |Exercise Exersice-4[B]|14 Videos
MISCELLANEOUS
ALLEN |Exercise EXERCISE-5(A)|15 Videos
MISCELLANEOUS
ALLEN |Exercise DATA SUFFICIENCY QUESTIONS|3 Videos
KINEMATICS (MOTION ALONG A STRAIGHT LINE AND MOTION IN A PLANE)
ALLEN |Exercise BEGINNER S BOX-7|8 Videos
PHYSICAL WORLD, UNITS AND DIMENSIONS & ERRORS IN MEASUREMENT
ALLEN |Exercise EXERCISE-IV|7 Videos

Similar Questions

Explore conceptually related problems

A particle is moving with a position vector, vec(r)=[a_(0) sin (2pi t) hat(i)+a_(0) cos (2pi t) hat(j)] . find Distance travelled by the particle in 1 sec is

The position vector of a particle is determined by the expression vec r = 3t^2 hat i+ 4t^2 hat j + 7 hat k . The displacement traversed in first 10 seconds is :

The position vector of an object moving in X-Z plane is vec(r)=v_(0)that(i)+a_(0)e^(b_(0)t)hat(k) . Find its (i) velocity (vec(v)=(dvec(r))/(dt)) (ii) speed (|vec(v)|) (iii) Acceleration ((dvec(v))/(dt)) as a function of time.

The line of action of a force vec(F)=(-3hat(i)+hat(j)+5hat(k)) N passes through a point (7, 3, 1) . The moment of force (vec(tau)=vec(r)xxvec(F)) about origin is given by

Position vector of a particle is expressed as function of time by equation vec(r)=2t^(2)+(3t-1) hat(j) +5hat(k) . Where r is in meters and t is in seconds. Find the velocity vector

The position vector of a particle is given by vec(r)=1.2 t hat(i)+0.9 t^(2) hat(j)-0.6(t^(3)-1)hat(k) where t is the time in seconds from the start of motion and where vec(r) is expressed in meters. For the condition when t=4 second, determine the power (P=vec(F).vec(v)) in watts produced by the force vec(F)=(60hat(i)-25hat(j)-40hat(k)) N which is acting on the particle.

A particle moves in the xy plane and at time t is at the point vec r= t^(2) hat i + t^(3)-2t hat j . Then find velocity vector

A particle of mass 2 kg is moving with velocity vec(v)_(0) = (2hat(i)-3hat(j))m//s in free space. Find its velocity 3s after a constant force vec(F)= (3hat(i) + 4hat(j))N starts acting on it.

Position vector vec(r) of a particle varies with time t accordin to the law vec(r)=(1/2 t^(2))hat(i)-(4/3t^(3))hat(j)+(2t)hat(k) , where r is in meters and t is in seconds. Find suitable expression for its velocity and acceleration as function of time

Position vector vec(r) of a particle varies with time t accordin to the law vec(r)=(1/2 t^(2))hat(i)-(4/3t^(1.5))hat(j)+(2t)hat(k) , where r is in meters and t is in seconds. Find suitable expression for its velocity and acceleration as function of time.

ALLEN -MISCELLANEOUS-Exercise-04 [A]

The position vector of car w.r.t. its starting point is given as vecr=...
Text Solution
|
Answer the following : (i) A vector has magnitude & direction. Does ...
Text Solution
|
A room has dimensions 3 m xx 4 m xx5 m. A fly starting at one cronet e...
Text Solution
|
Vector vec(a) has components a(x)=3, a(y)=4. Find the components of a ...
Text Solution
|
Find: (i) "north cross west" " " (ii) "down dot south" (iii) "we...
Text Solution
|
The position vector of a particle of mass m= 6kg is given as vec(r)=[(...
Text Solution
|
A plane body has perpendicular axes OX and OY marked on it and is acte...
Text Solution
|
State with reasons, whether the following algebraic operations with sc...
Text Solution
|
A car travels due east on a level road for 30 km. It then turns due no...
Text Solution
|
Write the vector representation of the vectors A and B with respect to...
Text Solution
|
Find the kinetic energy of a particle of mass 200 g moving with veloci...
Text Solution
|
Acceleration of particle moving in straight line can be written as a=(...
Text Solution
|
The position vector of an object moving in X-Z plane is vec(r)=v(0)tha...
Text Solution
|
The position of a particle at time t is given by the relation x(t)=((V...
Text Solution
|
The related equations are : Q=mc(T(2)-T(1)), l(1)=l(0)[1+alpha(T(2)-T(...
Text Solution
|
A particle of mass m is in a uni-directional potential field where the...
Text Solution
|
Assume that the largest stone of mass 'm' that can be moved by a flowi...
Text Solution
|
A projectile fired at an angle of 45^(@) travels a total distance R, c...
Text Solution
|
In the formula P=(nRT)/(V-b)e^(-a/(RTV)). Find the dimensions of a and...
Text Solution
|
If instead of mass, length and time as fundamental quantities we choos...
Text Solution
|