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Understanding the Quadratic Expression: 9x² + 41x + 49
Understanding the Quadratic Expression: 9x² + 41x + 49
The quadratic expression 9x² + 41x + 49 is a key type of polynomial that appears frequently in algebra, calculus, and applied mathematics. Whether you're solving equations, analyzing graphs, or exploring optimization problems, understanding the behavior of this expression can greatly simplify complex mathematical tasks.
In this SEO-optimized article, we’ll break down the quadratic equation 9x² + 41x + 49, including its roots, vertex, discriminant, graph shape, and practical applications—all enriched with relevant keywords for better search visibility.
Understanding the Context
What Is a Quadratic Expression?
A quadratic expression has the general form:
ax² + bx + c,
where a ≠ 0.
In this case:
- a = 9
- b = 41
- c = 49
The graph of y = 9x² + 41x + 49 is a parabola that opens upward because a = 9 > 0.
Key Insights
Analyzing the Quadratic: Key Features and Calculations
1. The Discriminant – Does It Have Real Roots?
The discriminant D = b² – 4ac helps determine if the equation has real solutions:
D = (41)² – 4 × 9 × 49
D = 1681 – 1764
D = -83
Since D < 0, the equation has no real roots — the parabola does not intersect the x-axis.
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2. Vertex – The Peak or Bottom of the Parabola
The x-coordinate of the vertex is found using:
x = –b/(2a)
x = –41 / (2 × 9) = –41/18 ≈ -2.278
Substitute x = –41/18 into the original expression to find the y-coordinate:
y = 9(–41/18)² + 41(–41/18) + 49
= 9(1681/324) – (1681/18) + 49
= (15219/324) – (1681/18) + 49
= simplify denominators, convert:
= 15219/324 – 30258/324 + 15876/324
= (15219 – 30258 + 15876) / 324
= (5835) / 324 ≈ 17.97
So, the vertex is at approximately (–2.28, 17.97) — the minimum point of the parabola.
3. Y-Intercept and Axis of Symmetry
- y-intercept: Set x = 0 → y = 49
- Axis of symmetry: x = –41/18 ≈ –2.278
