–3y ≤ –18 y ≥
y ≥ 6
≥ 11 n ≥
n ≥ 11
5/n≥11
n≥
n ≥ 5/11
To solve this inequality, we first find the value of y that satisfies the equation -3y ≤ -18. Then, we look for the values of y that are greater than or equal to that solution.
Step 1: Solve the equation -3y ≤ -18.
To isolate y, we divide both sides of the inequality by -3. Remember, when dividing an inequality by a negative number, the direction of the inequality sign must be flipped.
-3y / -3 ≥ -18 / -3
Simplifying, we have y ≥ 6.
Step 2: Identify the values of y that are greater than or equal to 6.
Since y is greater than or equal to 6, any value of y that is equal to or greater than 6 will satisfy the inequality.
Therefore, the solution to the inequality y ≥ 6.
To solve the inequality –3y ≤ –18, we need to isolate the variable "y".
Step 1: Divide both sides of the inequality by -3 (the coefficient of y). Note that when dividing by a negative number, we need to flip the direction of the inequality sign.
–3y/-3 ≥ –18 / -3
Simplifying, we get:
y ≥ 6
Thus, the solution to the inequality –3y ≤ –18 is y ≥ 6.