Question
John and Kamira are playing a game together. John's score (J) and Kamira's score (K) after round one are shown on the number line.
John is -5
Kamira is 7
Now, determine ALL of the number(s) that will make the statement true. Numbers may be used more than once.
Complete the following statements:
The sum of John's score and Kamira's score is
a
.
The difference between John's score and Kamira's score is
.
The absolute value of the difference between John's score and Kamira's score is
.
The sum of the absolute value of John's score and the absolute value of Kamira's score is
.
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John is -5
Kamira is 7
Now, determine ALL of the number(s) that will make the statement true. Numbers may be used more than once.
Complete the following statements:
The sum of John's score and Kamira's score is
a
.
The difference between John's score and Kamira's score is
.
The absolute value of the difference between John's score and Kamira's score is
.
The sum of the absolute value of John's score and the absolute value of Kamira's score is
.
Skip to navigation
Answers
GPT-4o mini
Let's analyze the provided scores of John and Kamira and perform the calculations step by step.
**Given:**
- John's score (J) = -5
- Kamira's score (K) = 7
### 1. The sum of John's score and Kamira's score:
\[
\text{Sum} = J + K = -5 + 7 = 2
\]
So, the sum of John's score and Kamira's score is **2**.
### 2. The difference between John's score and Kamira's score:
\[
\text{Difference} = J - K = -5 - 7 = -12
\]
So, the difference between John's score and Kamira's score is **-12**.
### 3. The absolute value of the difference between John's score and Kamira's score:
\[
\text{Absolute Value of Difference} = |J - K| = |-12| = 12
\]
So, the absolute value of the difference between John's score and Kamira's score is **12**.
### 4. The sum of the absolute value of John's score and the absolute value of Kamira's score:
\[
\text{Sum of Absolute Values} = |J| + |K| = |-5| + |7| = 5 + 7 = 12
\]
So, the sum of the absolute value of John's score and the absolute value of Kamira's score is **12**.
### Summary:
- The sum of John's score and Kamira's score is **2**.
- The difference between John's score and Kamira's score is **-12**.
- The absolute value of the difference between John's score and Kamira's score is **12**.
- The sum of the absolute value of John's score and the absolute value of Kamira's score is **12**.
**Given:**
- John's score (J) = -5
- Kamira's score (K) = 7
### 1. The sum of John's score and Kamira's score:
\[
\text{Sum} = J + K = -5 + 7 = 2
\]
So, the sum of John's score and Kamira's score is **2**.
### 2. The difference between John's score and Kamira's score:
\[
\text{Difference} = J - K = -5 - 7 = -12
\]
So, the difference between John's score and Kamira's score is **-12**.
### 3. The absolute value of the difference between John's score and Kamira's score:
\[
\text{Absolute Value of Difference} = |J - K| = |-12| = 12
\]
So, the absolute value of the difference between John's score and Kamira's score is **12**.
### 4. The sum of the absolute value of John's score and the absolute value of Kamira's score:
\[
\text{Sum of Absolute Values} = |J| + |K| = |-5| + |7| = 5 + 7 = 12
\]
So, the sum of the absolute value of John's score and the absolute value of Kamira's score is **12**.
### Summary:
- The sum of John's score and Kamira's score is **2**.
- The difference between John's score and Kamira's score is **-12**.
- The absolute value of the difference between John's score and Kamira's score is **12**.
- The sum of the absolute value of John's score and the absolute value of Kamira's score is **12**.