c = \sqrt5^2 + 12^2 = \sqrt25 + 144 = \sqrt169 = 13 ext cm - Crosslake

Understanding the Context

In this case:

• a = 5 cm
  
• b = 12 cm
  
• c = hypotenuse = ?

Applying the theorem step-by-step:

• First, square the lengths: 5² = 25 and 12² = 144
  
• Then, add the squares: 25 + 144 = 169
  
• Finally, take the square root: √169 = 13

Thus, c = √(5² + 12²) = √169 = 13 cm, confirming the hypotenuse is exactly 13 centimeters.

Why This Matters

Understanding this calculation helps in fields ranging from construction and architecture to computer graphics and physics. The 5-12-13 triangle is particularly notable as one of the simplest Pythagorean triples — a set of three positive integers that satisfy the Pythagorean theorem. This triangle demonstrates how even complex-sounding radicals reduce to clean whole numbers, making real-world measurements both accurate and practical.

Key Insights

Real-World Applications

• Construction: Ensuring corners are square using 5–12–13 ratios for level foundations.
  
• Navigation & Design: Helping calculate straight-line distances in maps or layouts.
  
• Education: Teaching fundamental geometry and algebraic manipulation in classrooms worldwide.

Key Takeaways

• The expression c = √(5² + 12²) applies the Pythagorean theorem to find the hypotenuse.
  
• Breaking down the steps reinforces understanding of radicals, squares, and square roots.
  
• The result, c = 13 cm, showcases how math brings clarity to spatial problems.

Whether you're solving textbook problems or building physical structures, mastering such calculations strengthens your problem-solving toolkit. Next time you encounter a right triangle with sides 5 cm and 12 cm, recall this clear, powerful result: the hypotenuse is a clean 13 cm.

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Keywords: Pythagorean theorem, c = √(a² + b²), 5-12-13 triangle, right triangle calculation, geometry tips