Final Answer:
The equation 3xf(8) + 6 = x - h(6)/(2g(6)) can be completed using the values from the tables above by substituting the specific numerical values of f(8), h(6), and g(6) into the equation.
Step-by-step explanation:
To solve the given equation, we need to substitute the values of f(8), h(6), and g(6) into their respective places in the equation. Let's denote f(8) as F8, h(6) as H6, and g(6) as G6 for simplicity.
The equation becomes:
![\[3x \cdot F8 + 6 = x - (H6)/(2 \cdot G6)\]](https://img.qammunity.org/2024/formulas/engineering/high-school/bnrj3n7brfv13drnigz5shi35mlqxr57q6.png)
Now, plug in the numerical values for F8, H6, and G6 from the tables. After substituting these values, proceed to simplify the equation.
Once the substitutions are made, perform the arithmetic operations to combine like terms and isolate the variable x. If there are any constants, distribute them accordingly. After completing these steps, you'll arrive at the final answer for the equation.
In summary, solving the equation involves careful substitution and algebraic manipulation of the given values. By following these steps, the final answer can be obtained, providing a solution to the mathematical expression based on the information available in the provided tables.
Complete Question:
How can the equation 3xf(8) + 6 = x - h(6)/(2g(6)) be completed using the values from the tables above?