The solution set -18 and 0 are the true values of the absolute value equation
The absolute value equation that has the a solution set of -18 and 0 is |x + 9| = 9
<h3>How to determine the absolute value equation?</h3>
From the figure, the solution sets of the absolute value equation are given as:
x = {-18, 0}
Calculate the mean of the solution set
Mean = 0.5 * (-18 + 0)
Mean = -9
Calculate the difference of the solution set divided by 2
Difference = (0 + 18)/2
Difference = 9
The absolute value equation is the represented as:
|x - Mean| = Difference
Substitute known values
|x + 9| = 9
Hence, the absolute value equation that has the a solution set of -18 and 0 is |x + 9| = 9
Read more about absolute value equation at:
brainly.com/question/2166748
Answer:
Step-by-step explanation:
11. I can't see the full problem statement, so I'm unable to answer the question.
12. Answer below:
"one half" =
"negative five eighths" =
To evaluate the expression, you multiply the two numbers together:
13. Answer below:
"one third" =
"eleven sixteenths" =
To evaluate the expression, you multiply the two numbers together
Answer:
19
Step-by-step explanation:
<em>this </em><em>question</em><em> </em><em>means </em><em>you </em><em>have </em><em>to </em><em>place </em><em>the </em><em>value </em><em>of </em><em>-</em><em>7</em><em> </em><em>were </em><em>there's</em><em> </em><em>x </em><em>in </em><em>the </em><em>function</em><em>.</em>
<em>f(</em><em>-</em><em>7</em><em>)</em><em>=</em><em>-</em><em>3</em><em>(</em><em>-</em><em>7</em><em>)</em><em>-</em><em>2</em>
<em> </em><em> </em><em> </em><em> </em><em> </em><em> </em><em> </em><em>=</em><em>2</em><em>1</em><em>-</em><em>2</em>
<em> </em><em> </em><em> </em><em> </em><em> </em><em> </em><em> </em><em>=</em><em>1</em><em>9</em>
<em>I </em><em>hope</em><em> this</em><em> helps</em>