Question
Which two equations form a system with infinite solutions (same y intercepts) ? ** Hint: You must write #4-#6 in y = mx + b format first.
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2 points
Captionless Image
Option 1
Option 2
Option 3
Option 4
Option 5
Option 6
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2 points
Captionless Image
Option 1
Option 2
Option 3
Option 4
Option 5
Option 6
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To determine which two equations form a system with infinite solutions, we look for equations that represent the same line. This means they will have the same slope (m) and the same y-intercept (b).
The equations must be in the form \( y = mx + b \). Without the specific equations provided, I can't perform the calculations directly. However, if you can rewrite Options 4 to 6 in the form \( y = mx + b \) and then compare their slopes and intercepts, you can find two that are identical.
Here’s how you would generally approach this:
1. Convert each equation into slope-intercept form.
2. Identify the slope (m) and y-intercept (b) for each equation.
3. Look for two equations that have the same values for m and b.
If you provide the equations from options 4 to 6, I can help you analyze them further to identify the correct pair with infinite solutions.
The equations must be in the form \( y = mx + b \). Without the specific equations provided, I can't perform the calculations directly. However, if you can rewrite Options 4 to 6 in the form \( y = mx + b \) and then compare their slopes and intercepts, you can find two that are identical.
Here’s how you would generally approach this:
1. Convert each equation into slope-intercept form.
2. Identify the slope (m) and y-intercept (b) for each equation.
3. Look for two equations that have the same values for m and b.
If you provide the equations from options 4 to 6, I can help you analyze them further to identify the correct pair with infinite solutions.
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