-(3x%5E3-3%2B8x%5E4).jpeg "(8x^3-6x^4+3)-(3x^3-3+8x^4)")
Simplifying Polynomial Expressions
In mathematics, simplifying polynomial expressions involves combining like terms and arranging them in a standard form. Let's explore how to simplify the following expression:
(8x³ - 6x⁴ + 3) - (3x³ - 3 + 8x⁴)
Step 1: Distribute the Negative Sign
First, we need to distribute the negative sign in front of the second set of parentheses. Remember that multiplying a negative sign by each term inside the parentheses changes the sign of each term:
(8x³ - 6x⁴ + 3) + (-3x³ + 3 - 8x⁴)
Step 2: Combine Like Terms
Now, we can group the terms with the same variable and exponent together:
(-6x⁴ - 8x⁴) + (8x³ - 3x³) + (3 + 3)
Step 3: Simplify
Finally, we combine the coefficients of the like terms:
-14x⁴ + 5x³ + 6
Therefore, the simplified form of the given expression is -14x⁴ + 5x³ + 6.