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Shows how to find the perpendicular distance from a point to a line, and a proof of the formula.
The distance (or perpendicular distance) from a point to a line is the shortest distance from a fixed point to any point on a fixed infinite line in Euclidean geometry. It is the length of the line segment which joins the point to the line and is perpendicular to the line.
The distance of a point from a line is the shortest distance between the line and the point. Learn how to derive the formula for the perpendicular distance of a point from a given line with help of solved examples.
The distance between a point \(P\) and a line \(L\) is the shortest distance between \(P\) and \(L\); it is the minimum length required to move from point \( P \) to a point on \( L \). In fact, this path of minimum length can be shown to be a line segment perpendicular to \( L \).
The distance of a point from a line is the shortest distance between the line and the point. Learn how to derive the formula for the perpendicular distance of a point from a given line with help of solved examples.
The distance between a point and a line, is defined as the shortest distance between a fixed point and any point on the line. It is the length of the line segment that is perpendicular to the line and passes through the point.
Perpendicular Distance from Point to Line. The shortest distance between point and line is calculated by finding the length of the perpendicular drawn from the point to the line. Consider the line l: $Ax + By + C = 0$ and point $P(x₁, y₁)$. Note that PQ is the perpendicular from point P to line l. Let l$(PQ) = d$.
