Name a value for x that will complete the inequality that is shown then explain why the value make the inequality true 0.125<x<9/50
What would the value of x be and how would I explain that the inequality is true?
bro people still haven't answered this question in 2 years?!?!
9/50 = 0.18
so, you want any value between 0.125 and 0.18
well of course
yea
yea it has
To find a value for x that will complete the inequality 0.125 < x < 9/50, we need to ensure that the value we choose falls within the given range.
Let's start by considering the lower boundary of the inequality, which is 0.125. This means that x should be greater than 0.125 to satisfy the first part of the inequality.
Now let's consider the upper boundary of the inequality, which is 9/50. This means that x should also be less than 9/50 to satisfy the second part of the inequality.
To find a value for x within this range, we can take the average of the lower and upper boundaries.
0.125 is approximately equal to 1/8, and 9/50 is approximately equal to 0.18. Therefore, the average between these two values can be calculated as (1/8 + 0.18)/2 = 0.1525.
So, x = 0.1525 is a value that satisfies the entire inequality 0.125 < x < 9/50.
To explain why the inequality is true for this value, we can substitute x = 0.1525 back into the inequality and verify that it fulfills both conditions:
0.125 < 0.1525 < 9/50
0.125 is indeed less than 0.1525, and 0.1525 is less than 9/50. Therefore, the value x = 0.1525 satisfies the inequality and makes it true.