2x² + 2x – 144 = 0 → x² + x – 72 = 0 - AIKO, infinite ways to autonomy.

Solving the Quadratic Equation: How to Solve 2x² + 2x – 144 = 0 Using Simplification (x² + x – 72 = 0)

Solve quadratic equations efficiently with a simple algebraic transformation. This article explores how converting the equation 2x² + 2x – 144 = 0 into a simpler form—x² + x – 72 = 0—makes solving for x much easier. Whether you’re a student, educator, or math enthusiast, this step-by-step guide will help you understand the logic and mechanics behind quadratic simplification for faster and clearer results.

Understanding the Context

Introduction to Quadratic Equations

Quadratic equations are polynomial equations of the second degree, typically expressed in the standard form:

ax² + bx + c = 0

Common examples include ax² + bx + c = 0, where a ≠ 0. These equations can yield two real solutions, one real solution, or complex roots, depending on the discriminant b² – 4ac. One key strategy to solving quadratics is completing the transformation to standard form—often by simplifying coefficients.

Answered: Find the product: (x-12)2 O x²+144 O… | bartleby

Image Gallery

Solved Solve (x-2)2-72=0, where x is a real | Chegg.com

#shorts #maths #how to solve x^2 = (81/144) - YouTube

[ANSWERED] Solve the equation 2x 144 x 0 - Kunduz

Key Insights

In this post, we focus on the effective trick of dividing the entire equation by 2 to reduce complexity: turning 2x² + 2x – 144 = 0 into x² + x – 72 = 0.

Step-by-Step Conversion: From 2x² + 2x – 144 = 0 to x² + x – 72 = 0

Original Equation:
2x² + 2x – 144 = 0

Divide all terms by 2 (to simplify coefficients):
(2x²)/2 + (2x)/2 – 144/2 = 0

🔗 Related Articles You Might Like:

📰 Verizon Wireless Lake Orion 📰 Verizon Travel Wifi 📰 Verizon Assistant Chat 📰 5 Baxter International Inc Just Broke The 100 Threshold Is This Your Buy Signal 1637769 📰 Hotel Rooms In Lewisville Texas 2947144 📰 Cholestasis Of Pregnancy Symptoms 1632676 📰 Dollar To Inr Rate History 3603214 📰 Live Live Net Tv The Reveal Youve Been Waiting Forclick To Watch 1095426 📰 Ublock Orgins 9096147 📰 Secrets Revealed The Health Human Services Secretarys Surprising Plan To Transform Public Healthare You Ready 8609290 📰 White Cowgirl Boots The Iconic Footwear You Need To Own Before They Disappear 609372 📰 Easter 2024 Date 216702 📰 Unleash Confidence With This Maxi Maxi Skirt No Look Could Beat 5473903 📰 Ajfon 12 Mini 3511473 📰 Equilibrium Thermal 4149111 📰 Addax The Vanishing Antelope That Holds The Key To Earths Last Wild Dreams 2677958 📰 These Tapas Comics Are Taking Social Media By Stormdont Miss Out 3334948 📰 Shockingly Fast How A School Boy Made A Heroic Escape From D Day Imagine 2689306

Final Thoughts

Simplifies to:
x² + x – 72 = 0

Now the equation is simpler yet retains its core quadratic structure and key constants. The discriminant remains unchanged and easy to compute.

Why Simplify: The Benefits of Reformulating the Equation

Simplifying quadratic equations offers clear advantages:

Fewer coefficients to track: Smaller numbers reduce arithmetic errors.
Faster solution processing: Approaches like factoring, completing the square, or the quadratic formula become quicker.
Clearer insight: Recognizing patterns—such as factorable pairs—becomes more manageable.

In our case, dividing by 2 reveals that the equation relates directly to integers:
x² + x = 72 → (x² + x – 72 = 0)

This form perfectly sets up methods like factoring, quadratic formula, or estimation.