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Adding a constant term to the characteristic equation of SHM, will it be SHM or not

 Great question — this gets right to the definition of Simple Harmonic Motion (SHM).

1. Standard SHM equation

In SHM, the equation is:

d2xdt2=ω2x\frac{d^2 x}{dt^2} = -\omega^2 x

This means:

  • Acceleration is directly proportional to displacement
  • And always towards the equilibrium position (x = 0)

2. Modified equation with a constant term

Now suppose we have:

d2xdt2=ω2x+C\frac{d^2 x}{dt^2} = -\omega^2 x + C

This extra constant term (C) changes things.

3. Is it still SHM?

👉 Strict answer: No (not in the standard form)

Because:

  • Acceleration is not purely proportional to displacement from x = 0
  • There is an additional constant force

4. Key insight: Shift of equilibrium

We can rewrite the equation:

d2xdt2=ω2(xCω2)\frac{d^2 x}{dt^2} = -\omega^2 \left(x - \frac{C}{\omega^2}\right) \[a=-\omega^2\left(x-x_o\right) \]

Equilibrium shifted to :

\[x_o=\frac{C}{\omega^2}\] x=xCω2x' = x - \frac{C}{\omega^2}

Then:

d2xdt2=ω2x\frac{d^2 x'}{dt^2} = -\omega^2 x'

5. Final conclusion

Yes — it is still SHM, but about a shifted equilibrium position

Differences from usual SHM:

Feature Usual SHM Modified system
Equilibrium position x=0 x=Cω2x = \frac{C}{\omega^2}
Restoring force          ω2x          -\omega^2 x ω2(xxo)-\omega^2 (x - x_{\text{o}})
 Nature of motion          SHM        SHM (shifted origin) 
 Angular frequency      ω\omega                       Same ω\omega

6. Physical interpretation

This situation appears when:

  • A constant external force is applied
    (e.g., gravity + spring system)

Example:

  • Vertical spring:
    • Gravity adds constant term
    • New equilibrium shifts downward
    • Oscillations still SHM about new point

7. One-line takeaway

👉 Adding a constant term does NOT destroy SHM — it just shifts the equilibrium position.


JEE / NEET Level Problems

Q1. A particle obeys the equation:

\[\frac{d^2x}{dt^2}=-4x+8\]

Find equilibrium position and time period.
Solution:

Compare with:

\[a=-\omega^2 (x -x_o)\]

\[a=-4(x-2)\]

\[\omega^2 =4 \rightarrow \omega = 2 rad/s \]

Equilibrium position:

\[x_o= 2\]

Time period:

\[T=\frac{2\pi}{\omega}=\pi \sec \]



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Q2. A mass-spring system is subjected to a constant force F. Show that motion is SHM and find new equilibrium.
Solution:

Equation:

\[m \frac{d^2x}{dt^2}=-kx+F\]

\[\frac{d^2x}{dt^2}=-\frac{k}{m}x+\frac{F}{m}\]

Compare:

\[a=-\omega^2 (x -x_o)\]

\[a=-\frac{k}{m} (x-\frac{F}{k})\]

\[\omega^2=\frac{k}{m}, \ x_o=\frac{F}{k} \]

Equilibrium: Thus motion is SHM about shifted position xo.



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Q3. A particle oscillates under:

\[\frac{d^2x}{dt^2}=-9x+18\]

Find maximum velocity if amplitude about new equilibrium is 3 m.
Solution:

\[\omega = 3 \hspace{0.25cm} rad/s \]

\[v_{max}=A\omega= 3 \times 3 = 9 \hspace{0.25cm}m/s \]

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