3/4x + 10 = 7/8x. - Crosslake
Understanding and Solving the Equation: 3/4x + 10 = 7/8x
Understanding and Solving the Equation: 3/4x + 10 = 7/8x
Mathematics often presents challenges, especially when solving for variables in linear equations. One common type of problem involves isolating the variable x in expressions with fractions. In this article, we’ll explore how to solve the equation 3/4x + 10 = 7/8x step by step, explain the key algebraic concepts, and provide practical tips for correcting such equations—whether you're doing homework, preparing for exams, or simply expanding your math skills.
Understanding the Context
Solving the Equation: Step-by-Step Guide
Step 1: Understand the equation
We start with:
3/4x + 10 = 7/8x
Our goal is to isolate x on one side. This requires manipulating both sides using inverse operations while preserving equality.
Key Insights
Step 2: Eliminate the fractions by finding a common denominator
Both coefficients of x—3/4 and 7/8—are fractions. To simplify, express them with a common denominator (8):
- 3/4 = 6/8
- 7/8 already has denominator 8
Rewriting the equation:
(6/8)x + 10 = (7/8)x
Step 3: Subtract (6/8)x from both sides
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This isolates the constant on the left and terms with x on the right:
10 = (7/8)x – (6/8)x
10 = (1/8)x
Step 4: Solve for x
Now solve:
x = 10 × 8
x = 80
Final Answer
The solution to 3/4x + 10 = 7/8x is
x = 80
Why This Equation Matters: Key Concepts
- Linear Equations: This is a first-degree equation—meaning x appears only to the first power—common in algebra and physics applications.
- Fractions & Common Denominators: Converting fractions to a common denominator simplifies arithmetic and avoids errors.
- Balancing Techniques: Any operation (addition, subtraction, multiplication) applied to one side must be applied to the other to maintain equality.
