If two SHMs are repersented by y(1) = 10...

If two SHMs are repersented by `y_(1) = 10 sin (4 pi + pi//2)` and `y_(2) = 5 (sin 2 pi t +sqrt 8 cos 2 pi t)`, compare their amplitudes .

Text Solution

AI Generated Solution

To compare the amplitudes of the two simple harmonic motions (SHMs) given by \( y_1 = 10 \sin(4\pi t + \frac{\pi}{2}) \) and \( y_2 = 5(\sin(2\pi t) + \sqrt{8} \cos(2\pi t)) \), we can follow these steps: ### Step 1: Identify the amplitude of \( y_1 \) The first SHM is given by: \[ y_1 = 10 \sin(4\pi t + \frac{\pi}{2}) \] ...

Topper's Solved these Questions

LINEAR AND ANGULAR SIMPLE HARMONIC MOTION
CENGAGE PHYSICS|Exercise Solved Example|15 Videos
LINEAR AND ANGULAR SIMPLE HARMONIC MOTION
CENGAGE PHYSICS|Exercise Exercise 4.1|23 Videos
KINETIC THEORY OF GASES AND FIRST LAW OF THERMODYNAMICS
CENGAGE PHYSICS|Exercise Interger|11 Videos
MISCELLANEOUS KINEMATICS
CENGAGE PHYSICS|Exercise Interger type|3 Videos

Similar Questions

Explore conceptually related problems

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

If two SHMs are represented by equations y_(1) = 5 sin (2pi t + pi//6) and y_(2) = 5 [sin (3pi) + sqrt3 cos (3pi t)] . Find the ratio of their amplitudes.

If two SHMs are represented by equations y_1 = 4 sin[3 pi t + ( pi /3)], y_2 = 4 [sin(3 pi t) + sqrt 3 cos (3 pi t)], then the ratio of their amplitudes is

Two simple harmonic motion, are represented by the equations y _(1) = 10 sin ( 3 pi t + (pi)/(3)) y _(2) = 5 ( sin 3 pi t + sqrt3 cos 3 pi t ) Ratio of amplitude of y _(1) to y _(2) = x :1. The value of x is __________

The S.H.M.s of two particles are given by y_(1)=10 "sin" [2pi t +(pi)/(6)] " and " y_(2) =5["sin" 2pi t + sqrt(3) "cos" 2 pi t] The ratio of their amplitudes is

Two simple harmonic motions are represented by y_(1)=5 [sin 2 pi t + sqrt(3)cos 2 pi t] and y_(2) = 5 sin (2pit+(pi)/(4)) The ratio of their amplitudes is

The equation of displacement of two waves are given as y_(1) = 10 sin( 3 pi t + (pi)/(3)) , y_(2) = 5 [ sin 3 pi t + sqrt(3) cos 3 pi t] Then what is the ratio of their amplitudes

Statement-I : Two simple harmonic motions are given by y_(1) = 10sin (3pi t+(pi)/(4)) and y_(2) = 5(sin 3pit +sqrt(3) cos 3pi t) . These have amplitudes in the ratio 1:1 . Statement-II : y_(1) & y_(2) respresents two waves of amplitudes 5 & 5sqrt(3) . So the resultant amplitude is 10 .

Two simple harmonic motions are represented by the equations : x_1 = 5 sin (2 pi t + pi//4 ) , x_2 = 5^(2) (sin2 pi t + cos2 pi t) What is the ratio of their amplitudes ?

If two particles performing SHM, are given by, x_(1)=10 sin[3pi t +(pi//4)] and x_(2)=5[sin 3pi t +sqrt(3) cos 3 pi t] then the ratio of their amplitudes is

CENGAGE PHYSICS-LINEAR AND ANGULAR SIMPLE HARMONIC MOTION-Multiple Correct Answer Type

If two SHMs are repersented by y(1) = 10 sin (4 pi + pi//2) and y(2) ...
Text Solution
|
The springs shown in the figure are all upstretched in the beginning w...
Text Solution
|
A spring has natural length 40 cm and spring constant 500 N//m. A bloc...
Text Solution
|
A 1kg block is eecuting simpe hrmonic motion of ampliltude 0.1 m m on ...
Text Solution
|
A mass M is in static equilibrium on a massless vertical spring as sho...
Text Solution
|
Two blocks A (5kg) and B (2kg) attached to the ends of a spring consta...
Text Solution
|
The displacement of a particle varies with time according to the relat...
Text Solution
|
Three simple harmonic motions in the same direction having each of amp...
Text Solution
|
Funcation x=A sin^(2) omegat+B cos^(2) omegat+ C sin omegat cos omegat...
Text Solution
|
The x-coordinate of a particle moving on x-axis is given by x = 3 sin...
Text Solution
|