1. **State the problem:** Simplify the given expression (though the expression is not provided, we will explain the general approach to simplification). 2. **General formula and rules:** Simplification involves combining like terms, factoring, expanding, and reducing fractions where possible. 3. **Steps to simplify:** - Identify like terms and combine them. - Factor expressions if possible. - Cancel common factors in fractions using \cancel{} notation. 4. **Example:** Suppose the expression is $$\frac{2x^2 + 4x}{2x}$$. 5. **Simplify numerator and denominator:** $$\frac{2x^2 + 4x}{2x} = \frac{2x(x + 2)}{2x}$$ 6. **Cancel common factors:** $$\frac{\cancel{2x}(x + 2)}{\cancel{2x}} = x + 2$$ 7. **Final answer:** $$x + 2$$ This is the simplified form. If you provide the specific expression, I can simplify it step-by-step for you.