(x+8)(x-8)-x(x-6)

2 min read Jun 17, 2024
(x+8)(x-8)-x(x-6)

Simplifying the Expression (x+8)(x-8)-x(x-6)

This article will guide you through the process of simplifying the algebraic expression (x+8)(x-8)-x(x-6).

Expanding the Expression

The first step is to expand the expression by multiplying out the brackets.

  • (x+8)(x-8) can be expanded using the difference of squares formula: (a+b)(a-b) = a² - b². In this case, a = x and b = 8.

    • Therefore, (x+8)(x-8) = x² - 8² = x² - 64.
  • x(x-6) is expanded by distributing x to both terms inside the bracket.

    • Therefore, x(x-6) = x² - 6x.

Now, the expression becomes: x² - 64 - (x² - 6x)

Simplifying Further

Next, we need to remove the brackets and combine like terms.

  • Since there is a minus sign in front of the bracket, we need to change the signs of the terms inside the bracket.

    • This gives us: x² - 64 - x² + 6x
  • Now we can combine the x² terms, which cancel each other out.

    • This leaves us with: -64 + 6x

Final Simplified Expression

The simplified form of the expression (x+8)(x-8)-x(x-6) is 6x - 64.

Conclusion

By expanding the brackets and simplifying the expression, we were able to express it in a much simpler form. This simplified form is easier to work with when performing further calculations or solving equations.

Related Post