QUESTION IMAGE
Question
identifying slope and y-intercept of a line
identify the slope and y-intercept of each linear function’s equation.
$y = 1 - 3x$
$-x + 3 = y$
$y = 3x - 1$
$x - 3 = y$
slope = -1; y-intercept at 3
slope = 3; y-intercept at -1
slope = 1; y-intercept at -3
slope = -3; y-intercept at 1
For \( y = 1 - 3x \)
Step 1: Rewrite in slope - intercept form (\( y=mx + b \))
The slope - intercept form of a linear equation is \( y=mx + b \), where \( m \) is the slope and \( b \) is the \( y \) - intercept. Rewrite \( y = 1-3x \) as \( y=-3x + 1 \).
Step 2: Identify slope and \( y \) - intercept
Comparing with \( y = mx + b \), we have \( m=-3 \) (slope) and \( b = 1 \) (\( y \) - intercept). So it matches with "slope \(=-3 \); \( y \) - intercept at 1".
For \( -x + 3=y \)
Step 1: Rewrite in slope - intercept form
Rewrite \( -x + 3=y \) as \( y=-x + 3 \).
Step 2: Identify slope and \( y \) - intercept
Comparing with \( y=mx + b \), \( m=-1 \) (slope) and \( b = 3 \) (\( y \) - intercept). So it matches with "slope \(=-1 \); \( y \) - intercept at 3".
For \( y = 3x-1 \)
Step 1: Compare with slope - intercept form
The equation \( y = 3x-1 \) is in the form \( y=mx + b \).
Step 2: Identify slope and \( y \) - intercept
Here, \( m = 3 \) (slope) and \( b=-1 \) (\( y \) - intercept). So it matches with "slope \( = 3 \); \( y \) - intercept at \( -1 \)".
For \( x - 3=y \)
Step 1: Rewrite in slope - intercept form
Rewrite \( x - 3=y \) as \( y=x-3 \).
Step 2: Identify slope and \( y \) - intercept
Comparing with \( y=mx + b \), \( m = 1 \) (slope) and \( b=-3 \) (\( y \) - intercept). So it matches with "slope \( = 1 \); \( y \) - intercept at \( -3 \)".
Final Matching:
- \( y = 1-3x \) \(
ightarrow\) slope \(=-3 \); \( y \) - intercept at 1
- \( -x + 3=y \) \(
ightarrow\) slope \(=-1 \); \( y \) - intercept at 3
- \( y = 3x-1 \) \(
ightarrow\) slope \( = 3 \); \( y \) - intercept at \( -1 \)
- \( x - 3=y \) \(
ightarrow\) slope \( = 1 \); \( y \) - intercept at \( -3 \)
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For \( y = 1 - 3x \)
Step 1: Rewrite in slope - intercept form (\( y=mx + b \))
The slope - intercept form of a linear equation is \( y=mx + b \), where \( m \) is the slope and \( b \) is the \( y \) - intercept. Rewrite \( y = 1-3x \) as \( y=-3x + 1 \).
Step 2: Identify slope and \( y \) - intercept
Comparing with \( y = mx + b \), we have \( m=-3 \) (slope) and \( b = 1 \) (\( y \) - intercept). So it matches with "slope \(=-3 \); \( y \) - intercept at 1".
For \( -x + 3=y \)
Step 1: Rewrite in slope - intercept form
Rewrite \( -x + 3=y \) as \( y=-x + 3 \).
Step 2: Identify slope and \( y \) - intercept
Comparing with \( y=mx + b \), \( m=-1 \) (slope) and \( b = 3 \) (\( y \) - intercept). So it matches with "slope \(=-1 \); \( y \) - intercept at 3".
For \( y = 3x-1 \)
Step 1: Compare with slope - intercept form
The equation \( y = 3x-1 \) is in the form \( y=mx + b \).
Step 2: Identify slope and \( y \) - intercept
Here, \( m = 3 \) (slope) and \( b=-1 \) (\( y \) - intercept). So it matches with "slope \( = 3 \); \( y \) - intercept at \( -1 \)".
For \( x - 3=y \)
Step 1: Rewrite in slope - intercept form
Rewrite \( x - 3=y \) as \( y=x-3 \).
Step 2: Identify slope and \( y \) - intercept
Comparing with \( y=mx + b \), \( m = 1 \) (slope) and \( b=-3 \) (\( y \) - intercept). So it matches with "slope \( = 1 \); \( y \) - intercept at \( -3 \)".
Final Matching:
- \( y = 1-3x \) \(
ightarrow\) slope \(=-3 \); \( y \) - intercept at 1
- \( -x + 3=y \) \(
ightarrow\) slope \(=-1 \); \( y \) - intercept at 3
- \( y = 3x-1 \) \(
ightarrow\) slope \( = 3 \); \( y \) - intercept at \( -1 \)
- \( x - 3=y \) \(
ightarrow\) slope \( = 1 \); \( y \) - intercept at \( -3 \)