a² + 12² = 13², a² + 144 = 169, a² = 25, a = 5.

Understanding the Pythagorean Triplet: a² + 12² = 13² (a² + 144 = 169) and Why a = 5

One of the most celebrated expressions in geometry and algebra is the Pythagorean theorem:
a² + b² = c²
This foundational equation reveals powerful relationships in right-angled triangles. In this article, we explore a classic example:
a² + 12² = 13²

Step 1: Rewrite the Equation

We begin by substituting known values:

12 is the value of side b
13 is the length of the hypotenuse c

Understanding the Context

So the equation becomes:
a² + 144 = 169

Step 2: Solve for a²

Subtract 144 from both sides to isolate a²:
a² = 169 – 144
a² = 25

Step 3: Find a

Take the square root of both sides:
a = √25
a = 5

This elegant result proves a crucial piece of the Pythagorean triplet — families of integers that satisfy the a² + b² = c² relationship.

2.5: Ρίζες πραγματικών αριθμών - Άλγεβρα Α΄ Λυκείου | PDF

Image Gallery

Let a1, a2,......,a11 be real numbers satisfying a1=15, 27-2a2 0 & ak ...

5) → If A=a2+7a+12a2−2a−15 and B= a2+11a+28a2−4a−77 then the value of A..

Let ∣A1 ∣=3,∣A2 ∣=5 and ∣A1 +A2 ∣=5. The value of (2A1 +3A2 )⋅(3A1 −2A2 )..

Key Insights

What is a Pythagorean Triplet?

A Pythagorean triplet consists of three positive integers (a, b, c) such that:
a² + b² = c²
The simplest and most famous triplet is:
(5, 12, 13)
Here:

5² = 25
12² = 144
13² = 169
Validating: 25 + 144 = 169 — the equation holds true.

Why This Equation Matters

This identity is more than a math puzzle — it’s fundamental in geometry, engineering, architecture, and computer graphics. Understanding how to manipulate such expressions helps in solving triangle problems, verifying distances in coordinate systems, and more.

Conclusion

The equation a² + 12² = 13² simplifies beautifully to show that a = 5, illustrating a key Pythagorean triplet (5, 12, 13). Whether you’re a student learning triangles or a enthusiast exploring geometric proofs, mastering these algebraic relationships unlocks deeper insights into mathematics.

Key Takeaways:

The equation “a² + 12² = 13²” leads to a = 5
It confirms the (5, 12, 13) Pythagorean triplet
Geometry and algebra unite here in simple yet powerful harmony
Understanding such identities enhances problem-solving across STEM fields

🔗 Related Articles You Might Like:

📰 0 Interest Credit Cards 📰 Loan Repayment Calculator 📰 My Benefits Bank of America 📰 Canada Travel Advisory Usa 8693097 📰 Great Simulation Games For Pc 2735335 📰 Genevieve O Reilly Movies And Tv Shows 5595075 📰 Huge Cgnx Stock Move Inside The Power Move That Investors Are Obsessed With 9275808 📰 War Iraq Iran 9887668 📰 Deebo Samuel Fantasy 6445864 📰 Whats Inside The Epic Rolling Ball 3D Experience Eye Popping 3D Visuals Revealed 2837329 📰 Youll Never Believe What Happens When You Race In This Hyper Realistic Car Simulator Game 2152060 📰 From Struggling To Studio Grade How Samplr Changed This Artists Career Forever 380329 📰 5 Wood 394990 📰 The Shocking Mickey Mouse Video That Taken Youtube By Storm Whats Inside 3364469 📰 Gamehouse Hack Now Play Like A Pro With These Proven Secrets 2816223 📰 Celebrities Without Makeup 4572933 📰 The Shocking Legacy Of Yokes No One Dares To Explain 8548789 📰 Unlock Hidden Features Top Visual Studio 2010 Tools For Office Runtime Support 7439190

Final Thoughts

Ready to explore more math concepts? Visit our math resources to dive into triangle geometry, number theory, and beyond!