QUESTION IMAGE
Question
graph $y = 9x$.
Step1: Identify the slope-intercept form
The equation \( y = 9x \) is in the slope - intercept form \( y=mx + b \), where \( m \) is the slope and \( b \) is the y - intercept. For \( y = 9x \), \( m = 9 \) and \( b=0 \). This means the line passes through the origin \((0,0)\) (since when \( x = 0 \), \( y=9\times0 = 0\)).
Step2: Find another point
To graph the line, we can find another point. Let's choose \( x = 1 \). Substitute \( x = 1 \) into the equation \( y=9x \). Then \( y=9\times1=9 \). So we have another point \((1,9)\).
Step3: Draw the line
Plot the points \((0,0)\) and \((1,9)\) on the coordinate plane. Then draw a straight line passing through these two points. The line will have a steep positive slope since the slope \( m = 9\) is a large positive number.
(Note: Since this is a graphing problem, the final answer is the graph of the line \( y = 9x\) passing through \((0,0)\) and \((1,9)\) (and other points obtained by substituting different \( x\) values into the equation) on the given coordinate grid.)
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Step1: Identify the slope-intercept form
The equation \( y = 9x \) is in the slope - intercept form \( y=mx + b \), where \( m \) is the slope and \( b \) is the y - intercept. For \( y = 9x \), \( m = 9 \) and \( b=0 \). This means the line passes through the origin \((0,0)\) (since when \( x = 0 \), \( y=9\times0 = 0\)).
Step2: Find another point
To graph the line, we can find another point. Let's choose \( x = 1 \). Substitute \( x = 1 \) into the equation \( y=9x \). Then \( y=9\times1=9 \). So we have another point \((1,9)\).
Step3: Draw the line
Plot the points \((0,0)\) and \((1,9)\) on the coordinate plane. Then draw a straight line passing through these two points. The line will have a steep positive slope since the slope \( m = 9\) is a large positive number.
(Note: Since this is a graphing problem, the final answer is the graph of the line \( y = 9x\) passing through \((0,0)\) and \((1,9)\) (and other points obtained by substituting different \( x\) values into the equation) on the given coordinate grid.)