Question For each of the number lines, write an absolute value equation that has the following solution set. 26 and m

On a number line, an absolute value equation that has the given solution set is |m – 4| = 2. How to write the absolute value equation? By critically observing the given question, we can infer and logically deduce that the solution sets for this absolute value equation is given by: m = {2, 6} Next, we would calculate the mean of the solution sets as follows: m₁ = (2 + 6)/2 m₁ = 8/2 m₁ = 4. Also, we would calculate the difference in the solution sets as follows: m₂ = (6 – 2)/2 m₂ = 4/2 m₂ = 2. Mathematically, the absolute value equation is given by: |m – m₁| – m₂ = 0 |m – 4| – 2 = 0 |m – 4| = 2. Read more on absolute value equation here: https://brainly.com/question/27197258 #SPJ1 Reply

number line, anabsolute valueequation that has the givensolutionset is |m – 4| = 2.## How to write the absolute value equation?

solutionsets for thisabsolute valueequation is given by:meanof thesolutionsets as follows:m₁=4.differencein thesolutionsets as follows:m₂=2.absolute valueequation is given by:absolute value equationhere: https://brainly.com/question/27197258