To determine whether the inequality 22x + 9 < 4x + 9 is sometimes, always, or never true, we can start by simplifying the inequality.
First, we can subtract 4x from both sides:
22x – 4x + 9 < 9
This simplifies to:
18x + 9 < 9
Next, let’s subtract 9 from both sides:
18x < 0
Now, divide both sides by 18:
x < 0
This result tells us that the inequality 22x + 9 < 4x + 9 is true for all values of x that are less than 0.
Therefore, the inequality is sometimes true—specifically, it holds true when x is negative. If x is greater than or equal to 0, the inequality does not hold. Hence, we conclude that the inequality is not universally valid, but rather conditional based on the value of x.