-3x%5E2y%5E2%2B5xy%5E2.jpeg "(9x^4y^3-15x^3y^4) 3x^2y^2+5xy^2")
Factoring and Simplifying Algebraic Expressions
This article will explore the process of factoring and simplifying the following algebraic expression:
(9x^4y^3 - 15x^3y^4) 3x^2y^2 + 5xy^2
Step 1: Factor out the Greatest Common Factor (GCF)
First, we identify the greatest common factor (GCF) of the expression within the parentheses. Both terms have a common factor of 3x^3y^3. Factoring this out, we get:
(9x^4y^3 - 15x^3y^4) = 3x^3y^3(3x - 5y)
Step 2: Substitute the Factored Expression
Now we can substitute this factored expression back into the original equation:
3x^3y^3(3x - 5y) 3x^2y^2 + 5xy^2
Step 3: Simplify the Expression
We can simplify the expression by multiplying the terms:
9x^5y^5(3x - 5y) + 5xy^2
Step 4: Expand the Expression
To get the final simplified form, we expand the first term:
27x^6y^5 - 45x^5y^6 + 5xy^2
Conclusion
Therefore, the factored and simplified form of the expression (9x^4y^3 - 15x^3y^4) 3x^2y^2 + 5xy^2 is 27x^6y^5 - 45x^5y^6 + 5xy^2.
This process demonstrates the importance of factoring and simplifying algebraic expressions to obtain a more concise and understandable representation.