Solve for v. v/9 –9<1

To solve for v, we will isolate the variable on one side of the inequality.

v/9 - 9 < 1

First, let's subtract 9 from both sides:

v/9 - 9 + 9 < 1 + 9

Simplifying:

v/9 < 10

Now, multiply both sides of the inequality by 9 to remove the fraction:

9(v/9) < 10(9)

Simplifying further:

v < 90

So, the solution for v is v < 90.

Solve for f. 13≥5.94–f

To solve for f, we will isolate the variable on one side of the inequality.

13 ≥ 5.94 - f

First, let's subtract 5.94 from both sides:

13 - 5.94 ≥ 5.94 - 5.94 - f

Simplifying:

7.06 ≥ -f

Now, let's multiply both sides of the inequality by -1 to flip the direction of the inequality:

-1(7.06) ≤ -1(-f)

Simplifying further:

-7.06 ≤ f

So, the solution for f is f ≥ -7.06.

Solve for p. 14–p≤15

To solve for p, we will isolate the variable on one side of the inequality.

14 - p ≤ 15

First, let's subtract 14 from both sides:

14 - p - 14 ≤ 15 - 14

Simplifying:

-p ≤ 1

Now, let's multiply both sides of the inequality by -1 to flip the direction of the inequality:

-1(-p) ≥ -1(1)

Simplifying further:

p ≥ -1

So, the solution for p is p ≥ -1.

Solve for d. – 2.75d–1.71≥13.69

To solve for d, we will isolate the variable on one side of the inequality.

-2.75d - 1.71 ≥ 13.69

First, let's add 1.71 to both sides:

-2.75d - 1.71 + 1.71 ≥ 13.69 + 1.71

Simplifying:

-2.75d ≥ 15.4

Now, divide both sides of the inequality by -2.75. Since we are dividing by a negative number, we need to flip the direction of the inequality:

(-2.75d)/-2.75 ≤ 15.4/-2.75

Simplifying further:

d ≤ -5.6

So, the solution for d is d ≤ -5.6.

Solve for n. 9–n≤ – 1

To solve for n, we will isolate the variable on one side of the inequality.

9 - n ≤ -1

First, let's subtract 9 from both sides:

9 - n - 9 ≤ -1 - 9

Simplifying:

-n ≤ -10

Now, let's multiply both sides of the inequality by -1 to flip the direction of the inequality:

(-1)(-n) ≥ (-1)(-10)

Simplifying further:

n ≥ 10

So, the solution for n is n ≥ 10.