A particle is subjected to simple harmonic motions as: where is displacement and is time in seconds. The maximum acceleration of the particle is x \times 10^{-2} \, \text{m/s^2}. The value of is:
- A
- B
- C
- D
A particle is subjected to simple harmonic motions as: where is displacement and is time in seconds. The maximum acceleration of the particle is x \times 10^{-2} \, \text{m/s^2}. The value of is:
Correct answer:A
Standard Method
Given: Both SHMs have the same angular frequency .
Find: The value of if maximum acceleration is x \times 10^{-2} \, \text{m/s^2}.
For superposition of two SHMs of the same frequency, the resultant motion is also SHM. Its amplitude is
Here,
So,
Convert amplitude into SI unit:
Maximum acceleration in SHM is
Hence,
Given,
Therefore,
So, the correct option is A.
Phasor Interpretation
Given: The two SHM amplitudes are represented by phasors of magnitudes and with phase angle between them.
Find: Resultant maximum acceleration.
From phasor addition, the resultant amplitude is
Thus the resultant SHM can be written as
for some phase . Its acceleration is
So the maximum magnitude is
Now,
Therefore, the required value is , so the correct option is A.
Using algebraic addition of amplitudes as . This is wrong because the two SHMs have a phase difference of . Use phasor addition or the resultant amplitude formula with the cosine term.
Forgetting to convert into meters before computing acceleration in SI units. This gives a wrong numerical value in . Convert to before substitution.
Using instead of . In SHM, acceleration is proportional to displacement through , so the maximum magnitude is .
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