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Part 1
Select the correct choice below and fill in the answer​ box(es) to complete your choice.
A.
The slope of line r is enter your response here​, and the slope of line s is enter your response here. Since the slopes are​ different, lines r and s are not parallel.
​(Simplify your​ answers.)
B.
The slope of line r is enter your response here​, and the slope of line s is enter your response here. Since the product of their slopes is minus−​1, lines r and s are parallel.
​(Simplify your​ answers.)
C.
Since both lines have a slope of enter your response here​, lines r and s are parallel.
​(Simplify your​ answer.)
D.
The slope of line r is enter your response here​, and the slope of line s is enter your response here. Since the product of their slopes is not minus−​1, lines r and s are not parallel.
​(Simplify your​ answers.)
.
.
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1 answer

To determine which option is correct regarding the slopes of the lines r and s, you'll first need to calculate the slopes. Slopes of lines in Cartesian coordinates can be determined from two points or from their equations in the slope-intercept form (y = mx + b), where m is the slope.

However, you've not provided the equations of the lines or the coordinates of the points that line r and line s pass through. Without this information, I cannot directly calculate the slopes or select the correct choice.

Could you please provide the necessary details for line r and line s? This could be their equations or a set of points through which they pass.