1. which expression is equivalent to (2 + 3(x - 5)+4)?
a. (3x + 9)
b. (3x - 9)
c. (3x + 1)
d. (x - 9)

2. what is the solution to the equation (-5x - 6x + 9x = 2.4)?
a. (-1.2)
b. (1.2)
c. (4.8)
d. (-4.8)

3. for each expression, write an equivalent expression with fewer terms. show your thinking.
a (3(x + 4)-9)
b (\frac{1}{4}(4x + 12)-(3x + 2))
c (6 - 2(x + 8)-4)

4. solve each equation. show your thinking.
a (10b - 5b - 7b = 4.4)
b (-4(-c - 2)-6c = 3.8)
c (-\frac{2}{3}(3x - 9)-2x = 8)
d (\frac{1}{4}(6w - 12)+0.5w = 16)

Question

1. which expression is equivalent to (2 + 3(x - 5)+4)?
a. (3x + 9)
b. (3x - 9)
c. (3x + 1)
d. (x - 9)

2. what is the solution to the equation (-5x - 6x + 9x = 2.4)?
a. (-1.2)
b. (1.2)
c. (4.8)
d. (-4.8)

3. for each expression, write an equivalent expression with fewer terms. show your thinking.
  a (3(x + 4)-9)
  b (\frac{1}{4}(4x + 12)-(3x + 2))
  c (6 - 2(x + 8)-4)

4. solve each equation. show your thinking.
  a (10b - 5b - 7b = 4.4)
  b (-4(-c - 2)-6c = 3.8)
  c (-\frac{2}{3}(3x - 9)-2x = 8)
  d (\frac{1}{4}(6w - 12)+0.5w = 16)

Accepted Answer

# Explanation:
## Step1: Expand the parentheses
$2 + 3x - 15 + 4$
## Step2: Combine like terms
$3x + (2 - 15 + 4) = 3x - 9$
# Answer:
B. $3x - 9$

---

# Explanation:
## Step1: Combine like terms
$(-5 - 6 + 9)x = 2.4$
$-2x = 2.4$
## Step2: Solve for $x$
$x = \frac{2.4}{-2} = -1.2$
# Answer:
A. $-1.2$

---

# Explanation:
### Part a
## Step1: Expand the parentheses
$3x + 12 - 9$
## Step2: Combine constants
$3x + (12 - 9) = 3x + 3$

### Part b
## Step1: Simplify the fraction term
$\frac{1}{4}(4x) + \frac{1}{4}(12) - 3x - 2 = x + 3 - 3x - 2$
## Step2: Combine like terms
$(x - 3x) + (3 - 2) = -2x + 1$

### Part c
## Step1: Expand the parentheses
$6 - 2x - 16 - 4$
## Step2: Combine constants
$-2x + (6 - 16 - 4) = -2x - 14$
# Answer:
a. $3x + 3$
b. $-2x + 1$
c. $-2x - 14$

---

# Explanation:
### Part a
## Step1: Combine like terms
$10 - 12b = 4.4$
## Step2: Isolate the variable term
$-12b = 4.4 - 10 = -5.6$
## Step3: Solve for $b$
$b = \frac{-5.6}{-12} = \frac{7}{15} \approx 0.47$

### Part b
## Step1: Expand the parentheses
$4c + 8 - 6c = 3.8$
## Step2: Combine like terms
$-2c + 8 = 3.8$
## Step3: Isolate the variable term
$-2c = 3.8 - 8 = -4.2$
## Step4: Solve for $c$
$c = \frac{-4.2}{-2} = 2.1$

### Part c
## Step1: Expand the parentheses
$-\frac{2}{3}(3x) + \frac{2}{3}(9) - 2x = 8$
$-2x + 6 - 2x = 8$
## Step2: Combine like terms
$-4x + 6 = 8$
## Step3: Isolate the variable term
$-4x = 8 - 6 = 2$
## Step4: Solve for $x$
$x = \frac{2}{-4} = -0.5$

### Part d
## Step1: Expand the parentheses
$\frac{3}{4}(6w) - \frac{3}{4}(12) + 0.5w = 16$
$4.5w - 9 + 0.5w = 16$
## Step2: Combine like terms
$5w - 9 = 16$
## Step3: Isolate the variable term
$5w = 16 + 9 = 25$
## Step4: Solve for $w$
$w = \frac{25}{5} = 5$
# Answer:
a. $b = \frac{7}{15}$ (or $\approx 0.47$)
b. $c = 2.1$
c. $x = -0.5$
d. $w = 5$

Sovi.AI - AI Math Tutor

QUESTION IMAGE

Question

Explanation:

Step1: Expand the parentheses

Step2: Combine like terms

Step1: Combine like terms

Step2: Solve for $x$

Part a

Step1: Expand the parentheses

Step2: Combine constants

Part b

Step1: Simplify the fraction term

Step2: Combine like terms

Part c

Step1: Expand the parentheses

Step2: Combine constants

Part a

Step1: Combine like terms

Step2: Isolate the variable term

Step3: Solve for $b$

Part b

Step1: Expand the parentheses

Step2: Combine like terms

Step3: Isolate the variable term

Step4: Solve for $c$

Part c

Step1: Expand the parentheses

Step2: Combine like terms

Step3: Isolate the variable term

Step4: Solve for $x$

Part d

Step1: Expand the parentheses

Step2: Combine like terms

Step3: Isolate the variable term

Step4: Solve for $w$

Answer: