Question:medium

Figure 2.13 gives the x-t plot of a particle executing one-dimensional simple harmonic motion. (You will learn about this motion in more detail in Chapter13). Give the signs of position, velocity and acceleration variables of the particle at \(t\)\(0.3 \,s, 1.2 \,s, – 1.2 \,s.\)
the x-t plot of a particle executing one-dimensional simple harmonic motion

Updated On: Jan 20, 2026
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Solution and Explanation

Negative, Negative, Positive (at \(t\) = \(0.3 \;s\))
Positive, Positive, Negative (at \(t\) = \(1.2 \;s\))
Negative, Positive, Positive (at \(t\) = \(- 1.2 \,s\))
For simple harmonic motion (SHM) of a particle, acceleration (a) is given by the relation: 
\(a\) =\(– \omega^2 \times \omega \rightarrow angular \,frequency\) ....(i)
\(t\) = \(0.3 \,s\)

In this time interval, x is negative. Thus, the slope of the x - t plot will also be negative.Therefore, both position and velocity are negative. However, using equation (i), acceleration of the particle will be positive.
\(t\) = \(1.2 \,s\)

In this time interval, x is positive. Thus, the slope of the x - t plot will also be positive. Therefore, both position and velocity are positive. However, using equation (i) acceleration of the particle comes to be negative.
\(t\) = \(– 1.2 \,s\) 

In this time interval, x is negative. Thus, the slope of the x - t plot will also be negative. Since both x and t are negative, the velocity comes to be positive. From equation (i), it can be inferred that the acceleration of the particle will be positive.

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