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© William James Calhoun, 2001 6-7: Midpoint of a Line Segment OBJECTIVE: You will find the coordinates of the midpoint of a line segment in the coordinate.

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Presentation on theme: "© William James Calhoun, 2001 6-7: Midpoint of a Line Segment OBJECTIVE: You will find the coordinates of the midpoint of a line segment in the coordinate."— Presentation transcript:

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2 © William James Calhoun, 2001 6-7: Midpoint of a Line Segment OBJECTIVE: You will find the coordinates of the midpoint of a line segment in the coordinate plane. line segment - a piece of a line defined by two end-points midpoint of a line segment - the point half way between the two end points To find the midpoint, you go half the distance in the x-direction and half the distance in the y-direction. To find the midpoint is a simple process: (1) Find the average of the x-coordinates, (2) Find the average of the y-coordinates, (3) The midpoint is then (x-average, y-average).

3 © William James Calhoun, 2001 6-7: Midpoint of a Line Segment The coordinates of the midpoint of a line segment whose endpoints are at (x 1, y 1 ) and (x 2, y 2 ) are given by 6.7.1 MIDPOINT OF A LINE SEGMENT ON A COORDINATE PLANE B (2, 5) A (-4, -1) To get from point A to point B, you would go: 6 units right, then 6 units up. Going half-way would be: 3 units right, then 3 units up. So the midpoint would be the blue dot at (-1, 2). Notice: (-4 + 2)/2 = -1, and (-1 + 5)/2 = 2. M (-1, 2)

4 © William James Calhoun, 2001 EXAMPLE 1: Find the coordinates of the midpoint of a segment with the endpoints (3, -8) and (-4, 2). Use the formula: midpoint = That is it. 6-7: Midpoint of a Line Segment

5 © William James Calhoun, 2001 6-7: Midpoint of a Line Segment EXAMPLE 2: Find the coordinates of the other endpoint of a segment if one endpoint is (2, 6) and the midpoint is (-4, 2). The problem gives the x 1, y 1, and the average of the x’s and y’s. From the formula: and Solve for x 2.Solve for y 2. -2 -6 Take these values and write them as an ordered pair. Answer: (-10, -2).

6 © William James Calhoun, 2001 6-7: Midpoint of a Line Segment EXAMPLE 2: Find the coordinates of the other endpoint of a segment if one endpoint is (2, 6) and the midpoint is (-4, 2). Yes, it is the same example. Here is the CPM of finding the other endpoint. Endpoint #1(2, 6) Midpoint(-4, 2) Endpoint #2(, ) Look at the x-values. To get to -4 from 2, what must you add or subtract? subtract 6 -6 Do it again. -6 -10 Look at the y-values. To get to 2 from 6, what must you add or subtract? subtract 4 Do it again. -4 -2 There is your answer.

7 © William James Calhoun, 2001 6-7: Midpoint of a Line Segment HOMEWORK Page 372 #13 - 31 odd

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