(4x%5E2-6x%2B9)-2(4x%5E3-1).jpeg "(2x+3)(4x^2-6x+9)-2(4x^3-1)")
Simplifying the Expression: (2x+3)(4x^2-6x+9)-2(4x^3-1)
This expression involves expanding and combining terms. Let's break it down step by step:
1. Expanding the First Part
The first part of the expression, (2x+3)(4x^2-6x+9), is a product of two binomials. We can expand this using the FOIL method:
- First terms: (2x)(4x^2) = 8x^3
- Outer terms: (2x)(9) = 18x
- Inner terms: (3)(-6x) = -18x
- Last terms: (3)(9) = 27
Combining these terms, we get:
(2x+3)(4x^2-6x+9) = 8x^3 + 18x - 18x + 27
Notice that the middle terms cancel out.
2. Expanding the Second Part
The second part of the expression, -2(4x^3-1), involves simple distribution:
-2(4x^3-1) = -8x^3 + 2
3. Combining the Expanded Parts
Now, we can combine the expanded parts from steps 1 and 2:
(2x+3)(4x^2-6x+9)-2(4x^3-1) = (8x^3 + 18x - 18x + 27) + (-8x^3 + 2)
4. Simplifying the Expression
Finally, we combine like terms:
8x^3 - 8x^3 + 18x - 18x + 27 + 2 = 29
Conclusion
Therefore, the simplified form of the expression (2x+3)(4x^2-6x+9)-2(4x^3-1) is 29. This shows that the original expression simplifies to a constant value, meaning it is independent of the value of 'x'.