Evaluate `int^t _0 A sin omegat dt ` where A and omega are constants.

The distance moved by a particle in time from centre of ring under the influence of its gravity is given by x=a sin omegat where a and omega are constants. If omega is found to depend on the radius of the ring (r), its mass (m) and universal gravitation constant (G), find using dimensional analysis an expression for omega in terms of r, m and G.

Two point masses m_1 and m_2 are connected by a spring of natural length l_0 . The spring is compressed such that the two point masses touch each other and then they are fastened by a string. Then the system is moved with a velocity v_0 along positive x-axis. When the system reached the origin, the string breaks (t=0) . The position of the point mass m_1 is given by x_1=v_0t-A(1-cos omegat) where A and omega are constants. Find the position of the second block as a function of time. Also, find the relation between A and l_0 .

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 ?

Two coils have a mutual inductance of 0.005H. The current changes in the first coil according to equation I=I_0 sin omegat , where I_0 = 10A and omega = 100pi rad/sec. The maximum value of emf in the second coil is ___

The position of a particle moving along x-axis varies with time t according to equation x=sqrt(3) sinomegat-cosomegat where omega is constants. Find the region in which the particle is confined.

A particle moves along x-axis with acceleration a = a0 (1 – t// T) where a_(0) and T are constants if velocity at t = 0 is zero then find the average velocity from t = 0 to the time when a = 0.

The position of a particle moving in space varies with time t according as :- x(t)=3 cosomegat y(t)=3sinomegat z(t)=3t-8 where omega is a constant. Minimum distance of particle from origin is :-

The position vector of car w.r.t. its starting point is given as vecr="at" hati+bt^(2)hatj where a and b are positive constants. find the equation of trajectory :-

A particle is moving along x-axis with acceleration a=a_(0)(1-t//T) where a_(0) and T are constants. The particle at t=0 has zero velocity. Calculate the distance(position ) of particle.

The equation of a wave is given by Y = A sin omega ((x)/(v) - k) , where omega is the angular velocity and v is the linear velocity. Find the dimension of k .