Solve for y. – 10≤y–18

To solve for y, we can add 18 to both sides of the inequality:

-10 + 18 ≤ y - 18 + 18

8 ≤ y

Therefore, y ≥ 8.

Solve for s. s/2 > – 4

To solve for s, we can multiply both sides of the inequality by 2 (since dividing by 2 reverses the inequality):

s/2 * 2 > –4 * 2

s > –8

Therefore, s is greater than -8.

Solve for j. j/– 2 ≥ – 1.53

To solve for j, we can multiply both sides of the inequality by -2 (since multiplying by a negative number reverses the inequality):

(j/–2) * –2 ≤ –1.53 * –2

j ≥ 3.06

Therefore, j is greater than or equal to 3.06.

– 4>d–7

To solve for d, we can add 7 to both sides of the inequality:

-4 + 7 > d - 7 + 7

3 > d

Therefore, d is less than 3.

w–9≤ – 3

To solve for w, we can add 9 to both sides of the inequality:

w - 9 + 9 ≤ -3 + 9

w ≤ 6

Therefore, w is less than or equal to 6.