The unit of t is s and that of x is m in the expression `y=A cos((t)/(p)-qx).` Then

The unit of both x and y is m in the expression y=A sin[(2pi)/(lambda)(ct-x)]. Then

x = e^(-t) (a cos t + b sin t )

Find the equation of the tangents and normal to the curve x= sin 3t, y= cos 2t " at " t=(pi)/(4)

The equation of the vibration of a wire is y = 5 "cos"(pi x)/(3) sin 40 pi t , where x and y are given in cm and t is given in s. calculate the velocity of a particle at x = 1 . 5 cm at the instant t = (9)/(8)s *

The motion of a particle, along x-axis, follows the relation x = 8t- 3t^(2) . Here x and t are expressed in metre and second respectively . Find (i) the average velocity of the particle in time interval 0 to 1 s and (ii) its instantaneous velocity at t = 1 s.

For the variable t , the locus of the points of intersection of lines x - 2y = t and x + 2y = (1)/(t) is _

Computing area with parametrically represented boundaries : If the boundary of a figure is represented by parametric equation, i.e., x=x(t), y=(t), then the area of the figure is evaluated by one of the three formulas : S=-int_(alpha)^(beta)y(t)x'(t)dt, S=int_(alpha)^(beta)x(t)y'(t)dt, S=(1)/(2)int_(alpha)^(beta)(xy'-yx')dt, Where alpha and beta are the values of the parameter t corresponding respectively to the beginning and the end of the traversal of the curve corresponding to increasing t. The area of the region bounded by an are of the cycloid x=a(t-sin t), y=a(1- cos t) and the x-axis is

Find the equations of the tangent to the given curves at the indicated points: x= cos t , y =sin t at t = (pi)/(4)

The displacement of a particle in S.H.M. varies according to the relation x= 4 (cos pi t +sin pi t ) . The amplitude of the particle is

A force acts on a particle of mass 3kg, such that the position of the particle changes with time as per the equation x=3t-4t^2+t^3 . If we express x in m and t in s , work done in 4s will be