Solve for k. k/5 ≥ – 1

To solve for k, we need to isolate k on one side of the inequality.

We have the inequality: k/5 ≥ -1

To get rid of the fraction, we can multiply both sides of the inequality by 5: (5)(k/5) ≥ (-1)(5)

This simplifies to: k ≥ -5

Therefore, the solution for k is k ≥ -5.

Solve for y. y–16.5> – 17.5

To solve for y, we need to isolate y on one side of the inequality.

We have the inequality: y - 16.5 > -17.5

To isolate y, we can add 16.5 to both sides of the inequality: y - 16.5 + 16.5 > -17.5 + 16.5

This simplifies to: y > -1

Therefore, the solution for y is y > -1.

Solve for r. 2> r/10

To solve for r, we need to isolate r on one side of the inequality.

We have the inequality: 2 > r/10

To isolate r, we can multiply both sides of the inequality by 10: (10)(2) > (r/10)(10)

This simplifies to: 20 > r

Therefore, the solution for r is r < 20.

Solve for f. f–9.53<5.47

To solve for f, we need to isolate f on one side of the inequality.

We have the inequality: f - 9.53 < 5.47

To isolate f, we can add 9.53 to both sides of the inequality: f - 9.53 + 9.53 < 5.47 + 9.53

This simplifies to: f < 15

Therefore, the solution for f is f < 15.

n–19≤ – 13

To solve for n, we need to isolate n on one side of the inequality.

We have the inequality: n - 19 ≤ -13

To isolate n, we can add 19 to both sides of the inequality: n - 19 + 19 ≤ -13 + 19

This simplifies to: n ≤ 6

Therefore, the solution for n is n ≤ 6.

v+17< – 3

To solve for v, we need to isolate v on one side of the inequality.

We have the inequality: v + 17 < -3

To isolate v, we can subtract 17 from both sides of the inequality: v + 17 - 17 < -3 - 17

This simplifies to: v < -20

Therefore, the solution for v is v < -20.