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The slope of a vertical line is not defined.
a slope of zero. horizontal is undefined
No, vertical lines have an undefined slope.
Non-vertical lines could be slanted or horizontal.
Yes.
No. Horizontal lines have zero slope. Vertical lines have infinite slope.
run as in slope of a line is zero . horizontal lines have no slope and vertical lines have a slope of zero
The slope of a vertical line is not defined.
No, vertical lines have an undefined slope.
a slope of zero. horizontal is undefined
It is not defined.
When the lines are horizontal and vertical. (slope of zero) (undefined slope)
Non-vertical lines could be slanted or horizontal.
Although all lines have the relationship that defines slope, one can argue that not all lines do have one. The exception would be vertical lines. Slope is defined as the vertical rate of change divided by the horizontal rate of change. In the case of a vertical line, there is no horizontal rate of change, and calculating slope would cause division by zero. The closest you could come to expressing the slope of a vertical line would be ∞
Vertical lines always have an undefined slope. Slope for y = f(x) is given by :slope = dy/dxdx is zero at any point along a vertical line, making the slope undefined along a vertical line.
Non-examples of slope include horizontal lines, which have a slope of zero, and vertical lines, which have an undefined slope. Additionally, a constant function, represented by a flat line, also does not demonstrate slope since it does not change in the y-value as the x-value changes. Finally, any situation where there is no change in y despite a change in x does not represent a slope.
Yes.