In Figure
1 ,
A is (2, 2),
B is (5, 2), and
C is (5, 6)
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Figure 1
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Finding the distance from
A to
C.
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To find
AB or
BC, only simple subtracting is necessary.
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AB = 5 − 2
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and
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BC = 6 − 2
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AB = 3
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BC = 4
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To find
AC, though, simply subtracting is not sufficient. Triangle
ABC is a right triangle with
AC the hypotenuse. Therefore, by the
Pythagorean Theorem,
If
A is represented by the ordered pair (
x1,
y1) and
C is represented by the ordered pair (
x2,
y2), then
AB = (
x2 −
x1) and
BC = (
y2 −
y1).
Then
This is stated as a theorem.
Theorem 101: If the coordinates of two points are (
x1,
y1) and (
x2,
y2), then the distance,
d, between the two points is given by the following formula
(Distance Formula).
Example 1: Use the
Distance Formula to find the distance between the points with coordinates (−3, 4) and (5, 2).
Example 2: A triangle has vertices
A(12,5),
B(5,3), and
C(12, 1). Show that the triangle is isosceles.
By the
Distance Formula,
Because
AB =
BC, triangle
ABC is isosceles.
Fundamental Ideas
Coordinate Geometry
