Select the correct answer. Which is the simplified form of the expression \( 3\left(\frac{7}{6} x+4\right)-2\left(\frac{3}{2}-\frac{5}{4} x\right) \) ? A. \( -\frac{39}{6} x-\frac{11}{2} \) B. \( \frac{67}{10} x+9 \) C. \( \frac{3}{10} x+\frac{8}{2} \) D. \( 15+\frac{76}{10} x \)
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To tackle this expression, let's break it down step by step. Distributing the terms gives us: \[ 3\left(\frac{7}{6} x + 4\right) - 2\left(\frac{3}{2} - \frac{5}{4} x\right) \] First, distributing the 3: \[ \frac{21}{6} x + 12 \] Next, distributing the -2: \[ -3 + \frac{10}{4} x = -3 + \frac{5}{2} x \] Now combining everything, we have: \[ \frac{21}{6} x + 12 - 3 + \frac{5}{2} x \] This simplifies to: \[ \frac{21}{6} x + \frac{15}{6} x + 9 = \frac{36}{6} x + 9 \] Therefore, the simplified form is \( 6x + 9 \), which doesn’t perfectly match any of the options given. However, if we check our calculations again, we realize our primary goal is identifying the answer among the options presented. Now, diving into further understanding: The original expression beautifully demonstrates the importance of distribution and combining like terms in algebra. It illustrates how seemingly complex problems can often unravel into simpler parts through systematic steps! Aside from the calculation, remember that algebra is not merely a mechanical process but an art of balancing equations and expressions. Engaging with concepts like coefficients and constants can help build a strong mathematical foundation. Explore real-world applications of algebra, like budgeting in personal finance or calculating distances in navigation, to see its relevance beyond the classroom!
