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Geometric Transformations
Unit 1 Geometric Transformations
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Standard: m8g.5 Students will understand and apply the properties of parallel and perpendicular lines and understand the meaning of congruence.
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Element: m8g.5 Investigate characteristics of parallel and perpendicular lines both algebraically and geometrically.
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Element: m8g.5 Apply properties of angle pairs formed by parallel lines cut by a transversal.
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Unit 1 Vocabulary (Ch. 6 pg 256)
Acute Angle – measures less than 90°. Right Angle – measures equal to 90°. Obtuse Angle – have measures between 90° and 180°. Straight Angle – measures equal to 180°.
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Unit 1 vocabulary cont. Vertical Angles – opposite angles formed by intersecting lines. Vertical angles are congruent. Adjacent Angles – have the same vertex (angle), share a common side, and do NOT overlap.
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Unit 1 vocabulary cont. Complimentary Angles – angles whose sum of their measures is equal to 90°. If you put the angles together, the angles should form a right angle. Supplementary Angles – angles whose sum of their measures is equal to 180°. If you put the angles together, the angles should form a straight angle.
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Perpendicular Lines - lines that intersect at right angles.
Unit 1 vocabulary cont. Perpendicular Lines - lines that intersect at right angles. Parallel Lines – two lines in a plane that never intersect or cross. Draw the diagram on page 257.
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Transversal – a line that intersects two or more lines.
Unit 1 vocabulary cont. Transversal – a line that intersects two or more lines. Draw diagram on page 258.
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Complimentary angles
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Parallel lines cut by a transversal
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Angle Relationships
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Geometric city
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Angle Relationships
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Acute and obtuse angles Interior and exterior angles Vertical angles
Review your notes Acute and obtuse angles Interior and exterior angles Vertical angles Corresponding angles Same side angles Complementary and Supplementary angles
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Combining like terms Term – the part of an expression the is separated by a + or – sign. Variable – a symbol used to represent a quantity that can change. Coefficient – the number that is multiplied by a variable. Constant – a term without a variable; the value never changes. Like terms – terms that have the same variable(s) raised to the same powers(s).
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Combing like terms
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Distributive property
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Distributive property
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Coordinate System vocabulary
Coordinate plane – formed by two number lines that form right angles and intersect at their zero points. Y-axis – the vertical number line. X-axis – the horizontal number line.
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Coordinate system vocabulary cont.
Origin – The point of intersection of the two number lines. The ordered pair for the origin is (0,0). Quadrants – The number lines separate the coordinate plane into four quadrants (sections). Ordered Pair – Any point on the coordinate plane can be graphed by using a pair of numbers. The first number in the ordered pair is the x-coordinate. The second number in the ordered pair is the y- coordinate. (x,y).
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Coordinate system vocabulary cont.
X-coordinate – The first number in an ordered pair. Also called the abscissa. Y-Coordinate – The second number in an ordered pair. Also called the ordinate.
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Review of coordinate system
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Review of coordinate system
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Standard: M8g.1 Verify experimentally the congruence properties of rotations, reflections, and translations: lines are taken to lines and line segments to line segments of the same length; angles are taken to angles of the same measure; parallel lines are taken to parallel lines.
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Transformation – mapping of a geometric figure.
Vocabulary Transformation – mapping of a geometric figure. Reflection – mirror image produced by flipping a figure over a line. Line of Reflection – the line an image is flipped over.
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Translations
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Translations
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Translations
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Translation test PRacice
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Rotations
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Complete packet (packet will be your test grade) complete transformation Artwork (follow instructions on page) complete transformation airplane (follow instructions on page)
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Properties preserved (invariant) under a rotation: 1
Properties preserved (invariant) under a rotation: distance is preserved (lengths of segments are the same) angle measures (remain the same) parallelism (parallel lines remain parallel) colinearity (points stay on the same lines) midpoint (midpoints remain the same in each figure) orientation (lettering order remains the same)
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Reflections
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Write question and answer in math journal
How would you reflect an image over the x- axis? How would you translate a figure T(3,-5)? How would you rotate a point R(90)? How would you rotate an image R(270)? How would you rotate an image R(-90)?
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Transfer to Math journal
Dilation - A dilation is a transformation (notation ) that produces an image that is the same shape as the original, but is a different size. A dilation stretches or shrinks the original figure. The description of a dilation includes the scale factor (or ratio) and the center of the dilation.
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Scale factor definition
In two similar geometric figures, the ratio of their corresponding sides is called the scale factor. To find the scale factor, locate two corresponding sides, one on each figure. Write the ratio of one length to the other to find the scale factor from one figure to the other.
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MGSE8.G.3 Describe the effect of dilations, translations, rotations, and reflections on two‐ dimensional figures using coordinates.
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Math mashup
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Discovery Education
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Transfer to math journal
A tessellation of a flat surface is the tiling of a plane using one or more geometric shapes, called tiles, with no overlaps and no gaps. In mathematics, tessellations can be generalized to higher dimensions and a variety of geometries. A periodic tiling has a repeating pattern.
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