1. The problem is to simplify the expression: $$2 f (-5) - h (10) + 3 f (16)$$ given the functions values from the other expressions. 2. From the second expression: $$2 \times 2(3) + (-2)(12)$$, we interpret this as values for functions or constants, but since no explicit function values are given, we assume the values of $f$ and $h$ must be deduced from the other expressions. 3. From the third expression: $$\frac{1}{2} f (-6) - \frac{1}{2} g (-10)$$, again no explicit values are given. 4. From the fourth expression: $$-5 g (3) - 3 h (3) - f (3)$$, no explicit values are given. 5. From the fifth expression: $$2 \log (05) + \left(-\frac{1}{3}\right) h (8) - (-1) f (15)$$, note that $\log(05)$ is $\log(5)$. Since no explicit values for $f(x)$, $g(x)$, or $h(x)$ are provided, we cannot numerically evaluate the expression. Therefore, the simplified form of the first expression is: $$2 f(-5) - h(10) + 3 f(16)$$ without further information. If you provide the values of $f(-5)$, $h(10)$, and $f(16)$, I can compute the numerical result. Slug: "function expression" Subject: "algebra" Desmos: {"latex":"","features":{"intercepts":true,"extrema":true}} q_count: 5