+ 3m = (6 + 7m) - 12 = -6 + 7m - Feedz API
Understanding the Equation +3M = (6 + 7M) β 12 = β6 + 7M
Understanding the Equation +3M = (6 + 7M) β 12 = β6 + 7M
When faced with a mathematical expression like +3M = (6 + 7M) β 12 = β6 + 7M, solving it may seem complex at firstβespecially when multiple equations and variable terms appear. But with a clear breakdown, this equation becomes manageable and even insightful. In this article, weβll explore step-by-step how to solve and understand this equation, and how simplifying it leads to confirming the value of M.
Understanding the Context
The Equation Breakdown
We begin with:
+3M = (6 + 7M) β 12 = β6 + 7M
At first glance, this looks like three statements linked by equality:
- 3M + 3M = 6 + 7M β 12
- (6 + 7M) β 12 = β6 + 7M
While mathematically equivalent, interpreting this helps reinforce algebraic relationships and solving strategies.
Key Insights
Step 1: Simplify the Right-Hand Side
Start with:
(6 + 7M) β 12
Simplify the constants:
6 β 12 = β6
So,
(6 + 7M) β 12 = β6 + 7M
This matches the right side of the second part, confirming consistency.
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Step 2: Rewrite the Equation with All M Terms on One Side
We start from:
+3M = β6 + 7M
Subtract 7M from both sides:
3M β 7M = β6
β4M = β6
Step 3: Solve for M
Divide both sides by β4:
M = β6 Γ· (β4)
M = 6 Γ· 4
M = 1.5
Why This Equation Matters
While this equation may appear academic, equations like 3M = 7M β 12 represent many real-world scenarios: from calculating costs and revenue in business to understanding scientific relationships. The setting of multiple equivalent forms (expressions deemed equal) highlights algebraic equivalence and the importance of careful simplification.
