Question

To add the expression \( 9(k + \frac{1}{3}) + 10(\frac{1}{2}k - 1) \), we'll first distribute the constants (9 and 10) across the terms in the parentheses.

1. Distributing:
\[
9(k) + 9\left(\frac{1}{3}\right) + 10\left(\frac{1}{2}k\right) - 10(1)
\]
becomes:
\[
9k + 3 + 5k - 10
\]

2. Next, combine like terms:
- Combine the \(k\) terms: \(9k + 5k = 14k\)
- Combine the constant terms: \(3 - 10 = -7\)

So, the expression simplifies to:
\[
14k - 7
\]

Out of the provided options, the correct answer is:
**\(14k - 7\)**.

Use the properties of operations to add 4(g−2)+(g+2) .(1 point)
Responses

5g−6
5 g minus 6

5g+10
5 g plus 10

5g
5 g

5g−10

To add the expression \( 4(g - 2) + (g + 2) \), we will first distribute the 4 across the terms in the first parentheses.

1. Distributing:
\[
4(g) - 4(2) + (g + 2)
\]
becomes:
\[
4g - 8 + g + 2
\]

2. Next, combine like terms:
- Combine the \(g\) terms: \(4g + g = 5g\)
- Combine the constant terms: \(-8 + 2 = -6\)

So, the expression simplifies to:
\[
5g - 6
\]

Out of the provided options, the correct answer is:
**\(5g - 6\)**.

Use the properties of operations to subtract (h+k)−(2k−h) .(1 point)
Responses

−k
negative k

−2h−k
negative 2 h minus k

2h−k
2 h minus k

2h+k

To simplify the expression \( (h + k) - (2k - h) \), we first distribute the negative sign across the second parentheses.

1. Rewrite the expression:
\[
(h + k) - (2k - h) = (h + k) - 2k + h
\]

2. Combine like terms:
- Combine the \( h \) terms: \( h + h = 2h \)
- Combine the \( k \) terms: \( k - 2k = -k \)

So, the expression simplifies to:
\[
2h - k
\]

Out of the provided options, the correct answer is:
**\(2h - k\)**.

Use the properties of operations to subtract (p−3)−(2.4+2p) .(1 point)
Responses

p−5.4
p minus 5.4

−p+5.4
negative p plus 5.4

3p−5.4
3 p minus 5.4

−p−5.4

To simplify the expression \( (p - 3) - (2.4 + 2p) \), we start by distributing the negative sign to the terms inside the second parentheses.

1. Rewrite the expression:
\[
(p - 3) - (2.4 + 2p) = p - 3 - 2.4 - 2p
\]

2. Combine like terms:
- Combine the \( p \) terms: \( p - 2p = -p \)
- Combine the constant terms: \( -3 - 2.4 = -5.4 \)

So, the expression simplifies to:
\[
-p - 5.4
\]

Out of the provided options, the correct answer is:
**\(-p - 5.4\)**.

Subtract: 2(k−4)−3(2k−1) .(1 point)
Responses

8k−11
8 k minus 11

−4k−5
negative 4 k minus 5

−6k−18
negative 6 k minus 18

−4k−11

To simplify the expression \( 2(k - 4) - 3(2k - 1) \), we will first distribute the constants across the terms in the parentheses.

1. Distributing:
\[
2(k) - 2(4) - 3(2k) + 3(1)
\]
This becomes:
\[
2k - 8 - 6k + 3
\]

2. Now, combine like terms:
- Combine the \( k \) terms: \( 2k - 6k = -4k \)
- Combine the constant terms: \( -8 + 3 = -5 \)

So, the expression simplifies to:
\[
-4k - 5
\]

Out of the provided options, the correct answer is:
**\(-4k - 5\)**.