Simplifying the Expression: (3x - 2y⁴) - 3
This expression involves combining terms with different variables and exponents. To simplify it, we need to understand the order of operations and how to combine like terms.
Understanding the Expression
- (3x - 2y⁴): This part of the expression consists of two terms:
- 3x: A term with the variable 'x' multiplied by the constant 3.
- -2y⁴: A term with the variable 'y' raised to the power of 4, multiplied by the constant -2.
- -3: This is a constant term.
Simplifying the Expression
Since there are no like terms within the parentheses, we cannot combine them further. The only thing we can do is subtract the constant term from the entire expression:
(3x - 2y⁴) - 3 = 3x - 2y⁴ - 3
Final Result
The simplified form of the expression (3x - 2y⁴) - 3 is 3x - 2y⁴ - 3.
Important Note: Remember that we cannot combine the terms 3x, -2y⁴, and -3 because they have different variables and exponents.