11.3 distance midpoint formulas
DESCRIPTION
Chapter 11, Section 3: Distance and Midpoint FormulasTRANSCRIPT
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Warm Up:
Find the missing length to the nearest tenth of a unit. Both triangles are right triangles.
Triangle 1: Legs: 8ft and 12ft; find Hypotenuse.
Triangle 2: Leg: 10mm, Hypotenuse: 25mm; find Leg.
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Distance and Midpoint Formulas
Chapter 11, Section 3
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Finding DistanceUse Pythagorean Theorem to find the length
of a segment on a coordinate plane.Make a Right Triangle to do this.
Or, just use the Distance Formula that is based off of Pythagorean's Theorem.
Distance = √(x₂ – x₁)² + (y₂ – y₁)²X and Y are from coordinate points. ex.
(5, -2)
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Find the Distance between A(6,3) and B(1,9)
D = √(x₂ – x₁)² + (y₂ – y₁)²It doesn't matter which coordinate is 1
or 2.Because a -#² = +#D = √(6₂ – 1₁)² + (9₂ – 3₁)²D = √(5)² + (6)²D = √(25 + 36)D = √(61)D ≈ 7.8 (rounded to tenth)
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Use Distance FormulaD = √(x₂ – x₁)² + (y₂ – y₁)²
Distance 1: (3, 8), (2, 4)
Distance 2: (10, -3), (1, 0)
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Use Distance Formula to Determine Perimeter
Find Distance between each point, then add them to find perimeter.
AB = ?
BC = ?
CD = ?
DA = ?
D (3, 3)
A (0, -1)
B (8, 0)
C (9, 4)
√65
√17
√37
√25 = 5
These numbers add
up to 23.2681259
units, which is the perimeter.
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Midpoint FormulaThe midpoint of a segment is the POINT M.The midpoint is a dot with a coordinate (x, y).
M = ( [x₁ + x₂]/2, [y₁ + y₂]/2 )
Take the x coordinates, add, divide by 2 = new x coordinate.
Take the y coordinates, add, divide by 2 = new y coordinate.
M = ( x, y )
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Find the MidpointM = ( [x₁ + x₂]/2, [y₁ + y₂]/2 )
Find the midpoint between:
G(-3, 2) and H(7, -2)
( [-3 + 7]/2, [2 + -2]/2 )
( [4]/2, [0]/2 )
( 2, 0 ) ← Midpoint between G and H
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Find the Midpoints
Midpoint between A(2, 5) and B(8, 1):
Midpoint between P(-4, -2) and Q(2, 3):
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Assignment #32
Pages 575-576: 1-6 all, 8-21 all.