A horizontal, frictionless spring has a spring constant k = 440 N/m. How much work does it take to stretch the spring from x1 = 0.23 m to x2 = 0.46 m?

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### Physics Problem: Work Done on a Spring **Problem Statement:** A horizontal, frictionless spring has a spring constant \( k = 440 \, \text{N/m} \). How much work does it take to stretch the spring from \( x_1 = 0.23 \, \text{m} \) to \( x_2 = 0.46 \, \text{m} \)? **Options:** - \( \smallcircle \; 34.9 \, \text{J} \) - \( \smallcircle \; 23.3 \, \text{J} \) - \( \smallcircle \; 11.6 \, \text{J} \) - \( \smallcircle \; 46.6 \, \text{J} \) **Explanation:** To find the work done to stretch the spring, use the formula for the work done in stretching/compressing a spring: \[ W = \frac{1}{2} k (x_2^2 - x_1^2) \] Where: - \( W \) is the work done - \( k \) is the spring constant - \( x_1 \) is the initial displacement - \( x_2 \) is the final displacement Let's substitute the given values into the formula: \[ k = 440 \, \text{N/m} \] \[ x_1 = 0.23 \, \text{m} \] \[ x_2 = 0.46 \, \text{m} \] Calculating: \[ W = \frac{1}{2} \cdot 440 \left( (0.46)^2 - (0.23)^2 \right) \] \[ W = 220 \left( 0.2116 - 0.0529 \right) \] \[ W = 220 \cdot 0.1587 \] \[ W \approx 34.914 \, \text{J} \] Therefore, the correct answer is: \[ \boxed{34.9 \, \text{J}} \] This problem tests the understanding of the work-energy principle related to elastic potential energy in the context of Hooke's law.