They don't, they are parallel to each other.
The same. Parallel lines have the same slope.
-2. Slopes of parallel lines are the same. If the lines are different it is the intercedpt that is different.
Parallel lines have the same slope. The slope of the second line is also 13.
No, only lines that have the same slope can be parallel.
Parallel lines have the same slope. So if you have a line with slope = 2, for example, and another line is parallel to the first line, it will also have slope = 2.
The slope between two parallel lines is identical. This is because parallel lines have the same slope and will never intersect. The slope of a line is a measure of its steepness, and when two lines are parallel, they will have the same steepness, resulting in the same slope. Therefore, the slope between two parallel lines will always be equal.
For two lines to be parallel they must have the same slope. A line parallel to a line with slope -2 would have a slope of -2.
Parallel Lines have the same slope.
Parallel lines have the same slope.
I don't exactly understand what you are trying to say in this question. However, one thing I can tell you about the slope of parallel lines is that they are equal. Parallel lines must have the same slope.
The slope of parallel lines are the same, but the slope of perpendicular lines are negative reciprocals of each other.
Lines that have the same slope are said to be parallel lines.
If two lines are parallel and one has a slope of 1.3, what is the slope of the other line?
2. Parallel lines have the same slope.
The same. Parallel lines have the same slope.
The parallel lines will have the same slope of -5 but with different y intercepts
No, a line with a positive slope and a line with a negative slope cannot be parallel. Parallel lines have the same slope, meaning they rise or fall at the same rate. A positive slope indicates that a line rises as it moves from left to right, while a negative slope indicates that a line falls. Therefore, these two types of lines will eventually intersect if extended far enough, demonstrating that they are not parallel.