Question

complete the process of solving the equation. fill in the missing term and select the missing description. simplify any fractions. \\(\frac{s}{11} + 2 = 2\\) \\(\frac{s}{11} = 0\\) \\(s = \square\\) multiply both sides by 11

Explanation:

Step1: Analyze the first step

To get from \(\frac{s}{11}+2 = 2\) to \(\frac{s}{11}=0\), we use the Subtraction Property of Equality. Subtract 2 from both sides of the equation:
\(\frac{s}{11}+2 - 2=2 - 2\)
Simplifying both sides gives \(\frac{s}{11}=0\). So the missing description is "Subtract 2 from both sides".

Step2: Solve for \(s\)

We know that to solve \(\frac{s}{11}=0\) for \(s\), we multiply both sides by 11 (as given in the problem). Using the Multiplication Property of Equality:
\(\frac{s}{11}\times11 = 0\times11\)
Simplifying both sides, we get \(s = 0\).

Answer:

The missing description is "Subtract 2 from both sides" and the value of \(s\) is \(0\). So the completed table has the missing description as "Subtract 2 from both sides" and \(s=\boxed{0}\).