(3x+2)(x+1)(x+5)+(x+3)^3

2 min read Jun 16, 2024
(3x+2)(x+1)(x+5)+(x+3)^3

Expanding and Simplifying the Expression (3x+2)(x+1)(x+5)+(x+3)^3

This article will guide you through the process of expanding and simplifying the algebraic expression: (3x+2)(x+1)(x+5)+(x+3)^3.

Step 1: Expanding the First Part of the Expression

We begin by expanding the product of the first three binomials: (3x+2)(x+1)(x+5).

a) Multiplying the first two binomials: (3x+2)(x+1) = 3x² + 3x + 2x + 2 = 3x² + 5x + 2

b) Multiplying the result by the third binomial: (3x² + 5x + 2)(x+5) = 3x³ + 15x² + 5x² + 25x + 2x + 10 = 3x³ + 20x² + 27x + 10

Step 2: Expanding the Second Part of the Expression

Next, we expand the cube of the binomial: (x+3)^3

a) Applying the binomial theorem: (x+3)^3 = x³ + 3(x²)(3) + 3(x)(3²) + 3³ = x³ + 9x² + 27x + 27

Step 3: Combining the Expanded Parts

Now we have: 3x³ + 20x² + 27x + 10 + x³ + 9x² + 27x + 27

Step 4: Simplifying the Expression

Finally, we combine like terms: (3x³ + x³) + (20x² + 9x²) + (27x + 27x) + (10 + 27)

This gives us the simplified expression: 4x³ + 29x² + 54x + 37

Therefore, the expanded and simplified form of the expression (3x+2)(x+1)(x+5)+(x+3)^3 is 4x³ + 29x² + 54x + 37.

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