Solution: The vertex of a parabola $ h(x) = x^2 - 4x + c $ occurs at $ x = \frac-(-4)2(1) = 2 $, which matches the given condition. Now substitute $ x = 2 $ and set $ h(2) = 3 $: - Redraw

Finding the Vertex of the Parabola $ h(x) = x^2 - 4x + c $: A Step-by-Step Solution

📅 May 7, 2026 👤 scraface

May 07, 2026

Finding the Vertex of the Parabola $ h(x) = x^2 - 4x + c $: A Step-by-Step Solution

When analyzing quadratic functions, identifying the vertex is essential for understanding the graph’s shape and behavior. In this article, we explore how to find the vertex of the parabola defined by $ h(x) = x^2 - 4x + c $, using calculus and algebraic methods to confirm its location and connection to a specified point.

Understanding the Context

Understanding the Vertex of a Parabola

The vertex of a parabola given by $ h(x) = ax^2 + bx + c $ lies on its axis of symmetry. The x-coordinate of the vertex is found using the formula:

$$
x = rac{-b}{2a}
$$

For the function $ h(x) = x^2 - 4x + c $:

Solved: If x=k is a vertical symmetry line of the equation y=x^2+4x+c ...

Image Gallery

Solved: If x=k is a vertical symmetry line of the equation y=x^2+4x+c ...

Solved: The function: f(x)= (x^2+4x-12)/x^2+2x-8 has a removable ...

Vertex of A Parabola. Explained with pictures and illustrations. The ...

Standard Form Parabola Vertex at Buddy Franzen blog

Se la parabola di equazione $y = x^2 + 4x + | StudyX

Key Insights

$ a = 1 $
$ b = -4 $

Applying the formula:

$$
x = rac{-(-4)}{2(1)} = rac{4}{2} = 2
$$

This confirms the vertex occurs at $ x = 2 $, consistent with the given condition.

🔗 Related Articles You Might Like:

📰 Ky3 Radar Shock: How This Tech is Revolutionizing Security and Surveillance Today! 📰 Ky3 Radar: The Secret Weapon Thats Taking Surveillance to the Next Level! 📰 Boom in Surveillance! Ky3 Radar Has Just Been Unleashed—Are You Ready? 📰 Foreclosures Homes 8110897 📰 Ad Azure Pricing 2838651 📰 Zipair Tokyo 1792961 📰 Why Everyones Craving Mylic Musicdownload It Instantly 3436647 📰 You Wont Trust Whats Inside This Gatorade Plastic Bottle The Truth Is Alarming 4625183 📰 Free Games For Epic 5964204 📰 Parttime Jobs Near Me 7284467 📰 Cartoonnetwork Games 615169 📰 How Msd Bill Pay Can Cut Your Monthly Bills By Over 30Click To Learn 552829 📰 De Stock Price 505568 📰 Doubledriver 6230894 📰 Free Driving Game 406402 📰 Wells Fargo Bank Customer Service Number 8986332 📰 Toriyama Akira The Unstoppable Legend Behind Neon Genesis Evangelion 304020 📰 Tsla Price Skyrocketsscientists Weigh In On Elons Wild Surge 4376656

Final Thoughts

Determining the y-Coordinate of the Vertex

To find the full vertex point $ (2, h(2)) $, substitute $ x = 2 $ into the function:

$$
h(2) = (2)^2 - 4(2) + c = 4 - 8 + c = -4 + c
$$

We are given that at $ x = 2 $, the function equals 3:
$$
h(2) = 3
$$

Set the expression equal to 3:

$$
-4 + c = 3
$$

Solving for $ c $:

$$
c = 3 + 4 = 7
$$

Summary of the Vertex and Function Behavior