Alexa has $520 to spend at a bicycle store for some new gear and biking outfits. Assume all prices listed include tax. . She buys a new bicycle for $342.81. • She buys 4 bicycle reflectors for $3.90 each and a pair of bike gloves for $14.51. • She plans to spend some or all of the money she has left to buy new biking outfits for $47.72 each. Which inequality can be used to determine o, the maximum number of outfits Alexa can purchase while staying within her budget? 520 47.72(372.92 + o) 520 47.72(372.92 + o) O 520 47.720 + 372.92 520 47.720 + 372.92

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**Problem Statement:** Alexa has $520 to spend at a bicycle store for some new gear and biking outfits. Assume all prices listed include tax. - She buys a new bicycle for $342.81. - She buys 4 bicycle reflectors for $3.90 each and a pair of bike gloves for $14.51. - She plans to spend some or all of the money she has left to buy new biking outfits for $47.72 each. **Question:** Which inequality can be used to determine \( o \), the maximum number of outfits Alexa can purchase while staying within her budget? **Answer Choices:** - ( ) \( 520 \leq 47.72 (372.92 + o) \) - ( ) \( 520 \leq 47.72 o + 372.92 \) - ( ) \( 520 \leq 47.72 (372.92 + o) \) - ( ) \( 520 \leq 47.72 o + 372.92 \) **Explanation:** To find the correct inequality, first sum the initial expenses: - Cost of a new bicycle: $342.81 - Cost of bicycle reflectors: \( 4 \times 3.90 = 15.60 \) - Cost of bike gloves: $14.51 Total spent already: \( 342.81 + 15.60 + 14.51 = 372.92 \) The remaining budget is: \( 520 - 372.92 \) Let \( o \) be the number of outfits she can purchase. The inequality representing her budget constraint is: \[ 520 \geq 372.92 + 47.72o \] Solving for \( o \) will give the maximum number of outfits Alexa can buy. --- This problem is useful in educational settings to teach budgeting, algebraic expressions, and solving inequalities.