Question
Question 4 (1 point)
Listen
Given the equation y = -2x + 8 find the range. (hint- what would the graph look like?)
Question 4 options:
y = 8
All negative numbers
(-infinite, infinite)
All positive numbers
Question 5 (1 point)
Listen
Given the equation y = 18 find the range. (hint- what would the graph look like?)
Question 5 options:
y = 18
All positive numbers
All negative numbers
(-infinite, infinite)
Listen
Given the equation y = -2x + 8 find the range. (hint- what would the graph look like?)
Question 4 options:
y = 8
All negative numbers
(-infinite, infinite)
All positive numbers
Question 5 (1 point)
Listen
Given the equation y = 18 find the range. (hint- what would the graph look like?)
Question 5 options:
y = 18
All positive numbers
All negative numbers
(-infinite, infinite)
Answers
GPT-4o mini
**Question 4: Given the equation y = -2x + 8, find the range.**
The equation y = -2x + 8 represents a linear function with a negative slope. The y-intercept is 8, meaning the line crosses the y-axis at (0, 8), and as x increases, y decreases without bound.
Thus, the possible values for y can be any real number since there is no restriction on how low or high y can go. Therefore, the range is:
**(-infinite, infinite)**
---
**Question 5: Given the equation y = 18, find the range.**
The equation y = 18 represents a horizontal line where y is constant at 18 regardless of the value of x.
In this case, y can only take the value of 18; therefore, the range is:
**y = 18**
So to summarize:
**Question 4 answer:** (-infinite, infinite)
**Question 5 answer:** y = 18
The equation y = -2x + 8 represents a linear function with a negative slope. The y-intercept is 8, meaning the line crosses the y-axis at (0, 8), and as x increases, y decreases without bound.
Thus, the possible values for y can be any real number since there is no restriction on how low or high y can go. Therefore, the range is:
**(-infinite, infinite)**
---
**Question 5: Given the equation y = 18, find the range.**
The equation y = 18 represents a horizontal line where y is constant at 18 regardless of the value of x.
In this case, y can only take the value of 18; therefore, the range is:
**y = 18**
So to summarize:
**Question 4 answer:** (-infinite, infinite)
**Question 5 answer:** y = 18