Consider an object of mass m moving in f...

Consider an object of mass m moving in free space with velocity given by ` vec(v) = v_(0) cos omega t hat (i) +v_(0) sin omegat hat (j) ` . Here `v_(0)` and `omega` are constants and t represents time. calculate force acting on object and angle between force and momentum.

Text Solution

AI Generated Solution

To solve the problem, we will follow these steps: ### Step 1: Determine the velocity vector The velocity vector of the object is given by: \[ \vec{v} = v_0 \cos(\omega t) \hat{i} + v_0 \sin(\omega t) \hat{j} \] ...

Topper's Solved these Questions

LAWS OF MOTION
AAKASH INSTITUTE ENGLISH|Exercise TRY YOURSELF|69 Videos
LAWS OF MOTION
AAKASH INSTITUTE ENGLISH|Exercise ASSIGNMENT ( SECTION -A)|50 Videos
LAWS OF MOTION
AAKASH INSTITUTE ENGLISH|Exercise Assignment (SECTION-D) (Assertion-Reason Type Questions)|15 Videos
KINETIC THEORY
AAKASH INSTITUTE ENGLISH|Exercise EXERCISE (ASSIGNMENT) SECTION - D Assertion - Reason Type Questions|10 Videos
MAGNETISM AND MATTER
AAKASH INSTITUTE ENGLISH|Exercise ASSIGNMENT (SECTION D)|26 Videos

Similar Questions

Explore conceptually related problems

A particle moves so that its position vector is given by vec r = cos omega t hat x + sin omega t hat y , where omega is a constant which of the following is true ?

Position vector of a particle moving in x-y plane at time t is r=a(1- cos omega t)hat(i)+a sin omega t hat(j) . The path of the particle is

A particle is moving in a plane with velocity given by vec(u)=u_(0)hat(i)+(aomega cos omegat)hat(j) , where hat(i) and hat(j) are unit vectors along x and y axes respectively. If particle is at the origin at t=0 . Calculate the trajectory of the particle :-

A particle of mass 0.2 kg moves along a path given by the relation : vec(r)=2cos omegat hat(i)+3 sin omegat hat(j) . Then the torque on the particle about the origin is :

A particle moves such that its momentum vector vecp(t) = cos omega t hati + sin omega t hatj where omega is a constant and t is time. Then which of the following statements is true for the velocity vec v(t) and acceleration veca (t) of the particle :

A particle is moving with a position vector, vec(r)=[a_(0) sin (2pi t) hat(i)+a_(0) cos (2pi t) hat(j)] . Then -

Find the average speed of a particle whose velocity is given by V=V_(0) sin omega t t where T=2pi//omega is the time of complete cycle

A portion is fired from origin with velocity vec(v) = v_(0) hat(j)+ v_(0) hat(k) in a uniform magnetic field vec(B) = B_(0) hat(j) . In the subsequent motion of the proton

A particle move so that its position verctor varies with time as vec r=A cos omega t hat i + A sin omega t hat j . Find the a. initial velocity of the particle, b. angle between the position vector and velocity of the particle at any time, and c. speed at any instant.

AAKASH INSTITUTE ENGLISH-LAWS OF MOTION-Illustration

Consider an object of mass m moving in free space with velocity given ...
Text Solution
|
A variable force acts on a body of mass 2 kg intially at rest as shown...
Text Solution
|
A two block system is shown in figure . We shall draw complete free bo...
Text Solution
|
Two blocks of masses m(1) and m(2)(m(1) gt m(2)) connected by a massle...
Text Solution
|
Two block of masses m(1) and m(2) are lying on a frictionless horizont...
Text Solution
|
(A), (B) and (C) respectively are
Text Solution
|
Now when the surface is smooth , the toy car travels larger distance. ...
Text Solution
|