x^2 - (4y^2 - 4yz + z^2) = x^2 - 4y^2 + 4yz - z^2 - AIKO, infinite ways to autonomy.

Mastering the Identity: Analyzing the Equation $ x^2 - (4y^2 - 4yz + z^2) = x^2 - 4y^2 + 4yz - z^2 $

📅 May 2, 2026 👤 scraface

May 02, 2026

Mastering the Identity: Analyzing the Equation $ x^2 - (4y^2 - 4yz + z^2) = x^2 - 4y^2 + 4yz - z^2 $

Understanding algebraic identities is fundamental in mathematics, especially in simplifying expressions and solving equations efficiently. One such intriguing identity involves rewriting and simplifying the expression:

$$
x^2 - (4y^2 - 4yz + z^2) = x^2 - 4y^2 + 4yz - z^2
$$

Understanding the Context

At first glance, the two sides appear identical but require careful analysis to reveal their deeper structure and implications. In this article, we’ll explore this equation, clarify equivalent forms, and demonstrate its applications in simplifying algebraic expressions and solving geometric or physical problems.

Step 1: Simplify the Left-Hand Side

Start by simplifying the left-hand side (LHS) of the equation:

Solved x2−4x+y2+z2=−415 (x−1)2+(y−1)2+z2=1 | Chegg.com

Image Gallery

Solved x2−4x+y2+z2=−415 (x−1)2+(y−1)2+z2=1 | Chegg.com

Solved x^2 - 4x + y^2 + z^2 = -15/4 x^2 + y^2 + (z + l)^2 | Chegg.com

Solved | Chegg.com

1. x2+y2+4z2=10 2. z2+4y2−4x2=4 3. 9y2+z2=16 4. | Chegg.com

x2−4y2=−zx2−z2=−yx2+16y2+4z2=1x2+4z2=yx2−y2+z2=04x2+9 | Chegg.com

Key Insights

$$
x^2 - (4y^2 - 4yz + z^2)
$$

Distributing the negative sign through the parentheses:

$$
x^2 - 4y^2 + 4yz - z^2
$$

This matches exactly with the right-hand side (RHS), confirming the algebraic identity:

$$
x^2 - (4y^2 - 4yz + z^2) = x^2 - 4y^2 + 4yz - z^2
$$

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Final Thoughts

This equivalence demonstrates that the expression is fully simplified and symmetric in its form.

Step 2: Recognize the Structure Inside the Parentheses

The expression inside the parentheses — $4y^2 - 4yz + z^2$ — resembles a perfect square trinomial. Let’s rewrite it:

$$
4y^2 - 4yz + z^2 = (2y)^2 - 2(2y)(z) + z^2 = (2y - z)^2
$$

Thus, the original LHS becomes:

$$
x^2 - (2y - z)^2
$$

This reveals a difference of squares:
$$
x^2 - (2y - z)^2
$$

Using the identity $ a^2 - b^2 = (a - b)(a + b) $, we can rewrite:

$$
x^2 - (2y - z)^2 = (x - (2y - z))(x + (2y - z)) = (x - 2y + z)(x + 2y - z)
$$