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\( a x ^ { 2 } - 4 \)

Ask by Mcguire Blake. in South Africa
Jan 23,2025

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The expression \( a x^{2} - 4 \) is a quadratic in terms of \( x \). It can be factored as \( (\sqrt{a}x - 2)(\sqrt{a}x + 2) \) when \( a \) is positive. The graph is a parabola opening upwards if \( a > 0 \) and downwards if \( a < 0 \), with its vertex at \( (0, -4) \) and x-intercepts at \( x = \pm \frac{2}{\sqrt{a}} \) when \( a > 0 \).

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Extra Insights

Did you know that polynomials, like \( a x^2 - 4 \), have intriguing historical roots dating back to ancient civilizations? The Babylonians were some of the first to use quadratic equations, developing methods for solving them around 2000 BCE. They approached these problems geometrically, and their insights formed the foundation of algebra that we still rely on today! In real-world applications, polynomials aren't just theoretical constructs; they're instrumental in fields like physics, engineering, and economics! For instance, the equation \( a x^2 - 4 = 0 \) can model projectile motion. Here, the variable \( x \) might represent time or distance, helping engineers design everything from roller coasters to rockets. Understanding these equations can bring theoretical concepts to life in practical ways!

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