2. let ( f(h) ) be the number of customers in a store ( h ) hours after 9 a.m. explain the meaning of each statement.
a. ( f(h) = 38 )
b. ( f(3.5) = f(10) )

in exercises 3–5, solve the inequality. graph the solution.
3. ( 4k - 3 geq 9 )
4. ( 12 - 4q leq 2q + 18 )
5. ( 2(2m + 1) -2 + 4(1 - m) )

Question

2. let ( f(h) ) be the number of customers in a store ( h ) hours after 9 a.m. explain the meaning of each statement.
  a. ( f(h) = 38 )
  b. ( f(3.5) = f(10) )

in exercises 3–5, solve the inequality. graph the solution.
3. ( 4k - 3 geq 9 )
4. ( 12 - 4q leq 2q + 18 )
5. ( 2(2m + 1) > -2 + 4(1 - m) )

Accepted Answer

### Part 2 (Interpretation of Functions)
#### a. $ f(h) = 38 $
# Brief Explanations:
The function $ f(h) $ represents the number of customers $ h $ hours after 9 A.M. So $ f(h)=38 $ means that $ h $ hours after 9 A.M., there are 38 customers in the store. Here, $ h $ is a specific number of hours (though not specified in the equation itself, the equation states that at that particular $ h $-hour mark post 9 A.M., the customer count is 38).
# Answer:
$ h $ hours after 9 A.M., there are 38 customers in the store.

#### b. $ f(3.5)=f(10) $
# Brief Explanations:
$ f(3.5) $ is the number of customers 3.5 hours after 9 A.M. (which is 12:30 P.M., since $ 9 + 3.5 = 12.5 $ or 12:30 P.M.), and $ f(10) $ is the number of customers 10 hours after 9 A.M. (which is 7 P.M., since $ 9+10 = 19 $ or 7 P.M.). The equation $ f(3.5)=f(10) $ means that the number of customers in the store at 3.5 hours after 9 A.M. (12:30 P.M.) is equal to the number of customers at 10 hours after 9 A.M. (7 P.M.).
# Answer:
The number of customers 3.5 hours after 9 A.M. (12:30 P.M.) is equal to the number of customers 10 hours after 9 A.M. (7 P.M.).

### Exercise 3: Solve $ 4k - 3 \geq 9 $
# Explanation:
## Step 1: Add 3 to both sides
To isolate the term with $ k $, we add 3 to both sides of the inequality.
$ 4k - 3 + 3 \geq 9 + 3 $
Simplifying, we get $ 4k \geq 12 $.

## Step 2: Divide by 4
To solve for $ k $, we divide both sides by 4.
$ \frac{4k}{4} \geq \frac{12}{4} $
Simplifying, we get $ k \geq 3 $.

# Answer:
$ k \geq 3 $
(For graphing: Draw a number line, place a closed circle at 3 (since the inequality is "greater than or equal to"), and shade to the right of 3.)

### Exercise 4: Solve $ 12 - 4q \leq 2q + 18 $
# Explanation:
## Step 1: Add $ 4q $ to both sides
To get all $ q $-terms on one side, add $ 4q $ to both sides.
$ 12 - 4q + 4q \leq 2q + 18 + 4q $
Simplifying, we get $ 12 \leq 6q + 18 $.

## Step 2: Subtract 18 from both sides
To isolate the term with $ q $, subtract 18 from both sides.
$ 12 - 18 \leq 6q + 18 - 18 $
Simplifying, we get $ -6 \leq 6q $.

## Step 3: Divide by 6
To solve for $ q $, divide both sides by 6.
$ \frac{-6}{6} \leq \frac{6q}{6} $
Simplifying, we get $ -1 \leq q $ or $ q \geq -1 $.

# Answer:
$ q \geq -1 $
(For graphing: Draw a number line, place a closed circle at -1, and shade to the right of -1.)

### Exercise 5: Solve $ 2(2m + 1) > -2 + 4(1 - m) $
# Explanation:
## Step 1: Expand both sides
First, expand the left - hand side: $ 2(2m + 1)=4m + 2 $.
Then, expand the right - hand side: $ 4(1 - m)=4 - 4m $, so the right - hand side becomes $ -2+4 - 4m = 2 - 4m $.
The inequality is now $ 4m + 2>2 - 4m $.

## Step 2: Add $ 4m $ to both sides
To get all $ m $-terms on one side, add $ 4m $ to both sides.
$ 4m+2 + 4m>2 - 4m+4m $
Simplifying, we get $ 8m + 2>2 $.

## Step 3: Subtract 2 from both sides
Subtract 2 from both sides to isolate the term with $ m $.
$ 8m+2 - 2>2 - 2 $
Simplifying, we get $ 8m>0 $.

## Step 4: Divide by 8
Divide both sides by 8 to solve for $ m $.
$ \frac{8m}{8}>\frac{0}{8} $
Simplifying, we get $ m > 0 $.

# Answer:
$ m>0 $
(For graphing: Draw a number line, place an open circle at 0 (since the inequality is "greater than", not "greater than or equal to"), and shade to the right of 0.)

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QUESTION IMAGE

Question

Explanation:

Part 2 (Interpretation of Functions)

a. \( f(h) = 38 \)

Step 1: Add 3 to both sides

Step 2: Divide by 4

Answer:

b. \( f(3.5)=f(10) \)