(4n-5)^3

2 min read Jun 16, 2024
(4n-5)^3

Expanding (4n - 5)³

The expression (4n - 5)³ represents the cube of the binomial (4n - 5). To expand this, we can use the following methods:

1. Direct Multiplication

This method involves multiplying the binomial by itself three times:

(4n - 5)³ = (4n - 5) * (4n - 5) * (4n - 5)

First, we multiply the first two binomials:

(4n - 5) * (4n - 5) = 16n² - 20n - 20n + 25 = 16n² - 40n + 25

Then, we multiply the result by the remaining binomial:

(16n² - 40n + 25) * (4n - 5) = 64n³ - 160n² + 100n - 80n² + 200n - 125

Finally, we combine like terms:

** (4n - 5)³ = 64n³ - 240n² + 300n - 125 **

2. Binomial Theorem

The Binomial Theorem provides a general formula for expanding any binomial raised to a power. For (4n - 5)³, the formula can be applied as follows:

(4n - 5)³ = ³C₀(4n)³(-5)⁰ + ³C₁(4n)²(-5)¹ + ³C₂(4n)¹(-5)² + ³C₃(4n)⁰(-5)³

where ³C<sub>k</sub> represents the binomial coefficient, which can be calculated as:

³C<sub>k</sub> = 3! / (k! * (3 - k)!)

Applying the formula, we get:

(4n - 5)³ = (1)(64n³) + (3)(16n²)(-5) + (3)(4n)(25) + (1)(1)(-125)

Simplifying the expression, we arrive at the same result:

** (4n - 5)³ = 64n³ - 240n² + 300n - 125 **

Conclusion

Both methods lead to the same expanded form of (4n - 5)³, which is 64n³ - 240n² + 300n - 125. The choice of method depends on personal preference and the complexity of the expression. The Binomial Theorem might be preferred for higher powers, as it offers a more systematic approach.

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