(3xy)^2(2x^4y^3)/6x^8y

2 min read Jun 16, 2024
(3xy)^2(2x^4y^3)/6x^8y

Simplifying Algebraic Expressions: (3xy)^2(2x^4y^3)/6x^8y

This article will guide you through simplifying the algebraic expression: (3xy)^2(2x^4y^3)/6x^8y. We will break down the process step by step, ensuring you understand each stage.

Step 1: Expanding the Expression

Begin by expanding the expression using the rules of exponents:

  • (3xy)^2 = 3^2 * x^2 * y^2 = 9x^2y^2

Now, our expression becomes: (9x^2y^2)(2x^4y^3)/6x^8y

Step 2: Multiplying the Numerator

Next, multiply the terms in the numerator:

  • (9x^2y^2)(2x^4y^3) = 18x^(2+4)y^(2+3) = 18x^6y^5

The expression now reads: 18x^6y^5 / 6x^8y

Step 3: Simplifying the Expression

To simplify, divide the coefficients and subtract the exponents of the same variables in the numerator and denominator:

  • 18 / 6 = 3
  • x^(6-8) = x^(-2)
  • y^(5-1) = y^4

Therefore, the simplified expression becomes: 3x^(-2)y^4

Step 4: Expressing the Result with Positive Exponents

Finally, we can express the result using positive exponents by moving the term with the negative exponent to the denominator:

3y^4/x^2

Conclusion

The simplified form of the expression (3xy)^2(2x^4y^3)/6x^8y is 3y^4/x^2. By following the steps outlined above, you can confidently simplify complex algebraic expressions. Remember, understanding the rules of exponents and applying them correctly is crucial for achieving accurate results.

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