a^3 + b^3 = 7^3 - 3 \times 10 \times 7 = 343 - 210 = 133

Understanding the Equation: a³ + b³ = 7³ − 3 × 10 × 7 = 343 − 210 = 133

Mathematical expressions often hide elegant relationships and surprising simplifications, and the equation a³ + b³ = 7³ − 3 × 10 × 7 = 343 − 210 = 133 is a perfect example. While it begins deceptively straightforward, this equation reveals a fascinating interplay of cubes, arithmetic operations, and numerical simplification.

In this breakdown, we’ll explore how a³ + b³ equals 7³ − 3 × 10 × 7, ultimately computing to 133, a number rich in mathematical interest.

Understanding the Context

Breaking Down the Left-Hand Side: a³ + b³

On the left side, the identity a³ + b³ is a classic algebraic form known as the sum of cubes. This can be factored as:

$$
a³ + b³ = (a + b)(a² - ab + b²)
$$

Solved A=4×10B=10×3C=3×12D=12×20E=20×7 multiplication is | Chegg.com

Image Gallery

Solved Given:U={1,2,3,4,5,6,7,8,9,10}A={1,3,7,9}B={3,7,8,10} | Chegg.com

$Solved 12. \$ 3 \\times 10^{1}+7 \\times 10^{0} \$ is | Chegg.com$

Solved A.39. (3.0 × 108) (3.16 × 107) (5.36 x 104)(9.7 × | Chegg.com

Key Insights

While we won’t use the factorization here, recognizing this identity helps frame the relationship between a and b, especially when linked to specific numerical values or geometric interpretations.

Examining the Right-Hand Side: 7³ − 3 × 10 × 7

The right-hand side starts with 7³, meaning 343:

$$
7³ = 343
$$

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Final Thoughts

Then subtracts 3 × 10 × 7, which calculates to:

$$
3 × 10 × 7 = 210
$$

So the expression becomes:

$$
343 - 210 = 133
$$

This step demonstrates a direct arithmetic reduction—simple subtraction based on precise multiplication and exponentiation.

Connecting Both Sides: a³ + b³ = 133

Now, we know:

$$
a³ + b³ = 133
$$

The challenge becomes finding integers a and b such that their cubes sum to 133. While multiple real number pairs satisfy this, often the problem implies integer solutions for instructional clarity.