–0.6n ≤ 9.6
n ≥ –16
n ≥ 16
n ≤ –16
n ≤ 16
I Think Its n ≤ 16, Can U Help?
n ≥ –16
when you divide by a negative you have to flip the sign
Sooooo, n ≥ –16 Is My Answer?
Yes.
THANKS!
why is there a fake ms sue on a question thats 6 years old? jesus christ, get off the internet
Sure! To solve this inequality, we have two separate inequalities:
1. –0.6n ≤ 9.6
2. n ≥ –16
Let's solve them one by one.
1. –0.6n ≤ 9.6
To isolate the variable "n", we need to divide both sides of the inequality by –0.6. Remember, when dividing or multiplying by a negative number, the inequality sign flips.
–0.6n/-0.6 ≥ 9.6/-0.6
n ≥ -16
So the first inequality is n ≥ -16.
2. n ≥ –16
This is a simpler inequality. It states that "n" must be greater than or equal to -16.
Now, we need to determine which of these two inequalities is satisfied. Since we are looking for the intersection of two inequalities, we take the greater value for the variable "n."
n ≥ -16 means n could be any number greater than or equal to -16.
Comparing this to the answer choices, we see that n ≤ 16 is the correct one. This statement means that "n" is less than or equal to 16, which satisfies both inequalities.
Therefore, the answer is n ≤ 16.
No.
Study this site.
http://www.mathsisfun.com/algebra/inequality-solving.html