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

Q: 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

d (d) $y = 5\sin (\pi \,t + 4\pi )$, comparing it with standard equation $y = a\sin (\omega \,t + \phi ) = a\sin \left( {\frac{{2\,\pi \,t}}{T} + \phi } \right)$ $a = 5\,m$ and $\frac{{2\,\pi \,t}}{T} = \pi \,t$ ==> $T = 2\, sec.$

SECTION - A [PHYSICS - MCQ]

GSEB - English Medium

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

A$a = 10,\,T = 2$
B$a = 5,\,T = 1$
C$a = 10,T = 1$
D$a = 5,\,T = 2$

Easy

STD 11 Science
NEET
STD 11 - 13. oscillations
Physics

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