(D) The displacement equation is given by $x(t) = 8 \sin \left( \frac{\pi t}{4} \right) \text{ cm}$.At $t = 0 \text{ s}$,the displacement is $x(0) = 8

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(D) The displacement equation is given by $x(t) = 8 \sin \left( \frac{\pi t}{4} \right) \text{ cm}$.At $t = 0 \text{ s}$,the displacement is $x(0) = 8 \sin(0) = 0 \text{ cm}$.At $t = 2 \text{ s}$,the displacement is $x(2) = 8 \sin \left( \frac{\pi \times 2}{4} \right) = 8 \sin \left( \frac{\pi}{2} \right) = 8 \times 1 = 8 \text{ cm}$.The displacement in the time interval $t = 0 \text{ s}$ to $t = 2 \text{ s}$ is $\Delta x = x(2) - x(0) = 8 \text{ cm} - 0 \text{ cm} = 8 \text{ cm}$.

Class 11 Physics Oscillations Periodic, Oscillatory motion and its characteristics and types of SHM and Equation of SHM

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The displacement of a particle in an oscillatory motion at a time $t$ is given by $x = 8 \sin \frac{\pi t}{4} \text{ cm}$. Calculate its displacement in the time interval $t = 0 \text{ s}$ to $t = 2 \text{ s}$. (in $\text{ cm}$)

AP EAMCET 2017 All AP EAMCET

A
$4$
B
$2$
C
$12$
D
$8$

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Periodic, Oscillatory motion and its characteristics and types of SHM and Equation of SHM

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The displacement of a particle in an oscillatory motion at a time $t$ is given by $x = 8 \sin \frac{\pi t}{4} \text{ cm}$. Calculate its displacement in the time interval $t = 0 \text{ s}$ to $t = 2 \text{ s}$. (in $\text{ cm}$)

Similar Questions

The displacement of a particle executing $S.H.M.$ is given by $x = 0.01 \sin 100 \pi(t + 0.05)$. The time period is ........ $s$.

On an average,a human heart is found to beat $75$ times in a minute. Calculate its frequency and period.

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