Correct Answer: Option C

Explanation

This is an application of  Boyle’s Law (since temperature is constant):

P\(_1\)V\(_1\) = P\(_2\)V\(_2\)

Given:
- Initial volume, V\(_1\) = 50 cm\(^3\)
- Initial pressure, P\(_1\) = 5 N m\(^{-2}\)
- Distance piston is pushed in = 10 cm
- Cross-sectional area of tube, A = 2 cm\(^2\)

Decrease in volume = Area × Distance moved  
= 2 cm\(^2\) × 10 cm  
= 20 cm\(^3\)

Calculate the new volume V\(_2\)
V\(_2\)  = V\(_1\)  − decrease in volume  
= 50 cm\(^3\) − 20 cm\(^3\)
= 30 cm\(^3\)

Apply Boyle’s Law
P\(_1\)V\(_1\)  = P\(_2\)V\(_2\) 
5 × 50 = P\(_2\) × 30  

P\(_2\)  = \(\frac{(5 × 50)}{ 30}\)
P\(_2\)  = \(\frac{250}{30}\) 
P\(_2\)  = \(\frac{25}{3}\) N m\(^{-2}\)

(The pressure increases because the volume decreases at constant temperature.)

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