A mass is attached to two springs of spring constants and , respectively, as shown. The time period of oscillation of the mass on a frictionless surface is:

- A
- B
- C
- D
A mass is attached to two springs of spring constants and , respectively, as shown. The time period of oscillation of the mass on a frictionless surface is:

Correct answer:C
Standard Method
Given: A mass is attached to two springs with spring constants and on a frictionless surface.
Find: The time period of oscillation.
Both the springs are in parallel.
For springs in parallel, the equivalent spring constant is
The time period of a mass-spring system is
Substituting ,
Therefore, the time period is and the correct option is C.
Equivalent Spring Constant Approach
Given: The two springs are connected to the same mass, so they experience the same displacement during oscillation.
Find: The expression for the time period .
When the mass is displaced by some distance, both springs contribute restoring force. Therefore their effective stiffness adds.
So, for springs in parallel,
For simple harmonic motion of a mass-spring system,
Using the equivalent spring constant,
Hence, the required time period is .
Treating the springs as if they were in series. That is wrong because the mass is connected so that both springs undergo the same displacement. Use parallel combination, so the effective spring constant is .
Using the wrong SHM formula, such as writing frequency instead of time period. For a mass-spring system, the time period is , not its reciprocal.
Choosing an option with . Effective stiffness cannot be obtained by subtracting spring constants in this arrangement. Both springs increase the restoring force, so their constants add.
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