If a SHM is represented by the equation `x=10 sin(pit+(pi)/(6))` in Si units, then determine its amplitude, time period and maximum uelocity `upsilon_(max)` ?

A particle executes SHM represented by the equation, y = 0.02 sin (3.14t+(pi)/(2))m . Find (i) amplitude (ii) time period (iii) frequecy (iv) epoch (v) maximum velocity and (vi) maximum acceleration.

An SHM is given by the equation x = 8 sin (4 pi t) + 6 cos (4pit)] cm find its amplitude and period

A SHM motion is represented by y=3sin2 pi t+4sin(2 pi t+(pi)/(6))+4sin(2 pi t+(5 pi)/(6))cm. The amplitude and time period of motion are ?

A wave is represented by the equation y = A sin(10pix + 15pit + (pi)/(3)) where x is in meter and t is in seconds. The expression represents :

A wave is represented by the equation y= A sin ( 10 pi x + 15 pi l + (pi)/(6)) wher x is in metre and t in second. The expression represents

A simple harmonic travelling wave is represented by y=50sinpi(20t-0.08x) is SI units. Find its amplitude, time period and wavelength. Also, calculate maximum particle velocity.

A simple harmonic wave having an amplitude a and time period T is represented by the equation y = 5"sin"pi(t + 4)m . Then the value of amplitude (a) in (m) and time period (T) in second are

The equation of linear SHM is x= 10 sin ( 4pi t + pi/6) cm. Find the period and maximum speed of the motion.

Two SHW are represented by the equations x_1 = 20 sin [5pit +pi/4] and x_2 = 10 (sin5pit+sqrt(3) cos 5 pit] . The ratio of the amplitudes of the two motions is

Two simple harmonic motions are represented by the equations y_(1) = 10 sin(3pit + pi//4) and y_(2) = 5(sin 3pit + sqrt(3)cos 3pit) their amplitude are in the ratio of ………… .