The slope of a line is its gradient
The word that describes the steepness of a line is "slope." In mathematical terms, slope measures the change in the vertical direction (rise) relative to the change in the horizontal direction (run) between two points on the line. A positive slope indicates an upward trend, while a negative slope indicates a downward trend.
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The word that describes slope is "gradient." Gradient refers to the steepness or incline of a line, typically in a mathematical context, representing the change in vertical distance (rise) over the change in horizontal distance (run). In geography or physics, it can also indicate the rate of change in a particular direction.
Infinite. The line is perpendicular to the ordinate.
Slope is monosyllabic.
negative
The word that describes the steepness of a line is "slope." In mathematical terms, slope measures the change in the vertical direction (rise) relative to the change in the horizontal direction (run) between two points on the line. A positive slope indicates an upward trend, while a negative slope indicates a downward trend.
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The word that describes slope is "gradient." Gradient refers to the steepness or incline of a line, typically in a mathematical context, representing the change in vertical distance (rise) over the change in horizontal distance (run). In geography or physics, it can also indicate the rate of change in a particular direction.
Synonyms for gradient: acclivity, bank, declivity, grade, hill, incline, rise, slope Adjectives that describe gradient: steep gradual positive negative sharp localized
Infinite. The line is perpendicular to the ordinate.
The slope of a vertical line would be parallel to the y axis.
It would be a undefined slope.There are four types of slope:Postive slope (when lines go uphill from left to right)Negative slope (when lines go downhill from left to right)Zero slope (when lines are horizontal)Undefined slope (when lines are vertical)
Slope is monosyllabic.
The word that means the direction toward the bottom of a slope is "downhill." It describes the path or movement that goes from a higher elevation to a lower one, typically associated with gravity. In various contexts, "downhill" can also imply a decline or deterioration in quality or performance.
If the line passing through these points is a straight line then it has a positive gradient.
The direction of largest increase/decrease; the tangent to the first derivationGradient can also be described as the slope of a line or of a road, or as a rate of change.slopeConstituents