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Geometry Review. Test Chapter 2. Undefined terms. In Geometry, we use three undefined terms which are accepted a intuitive ideas. These terms are point, line, and plane. A point, according to Euclid, is “that which has no size.” We usually name points using capital letters.
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Geometry Review Test Chapter 2
Undefined terms • In Geometry, we use three undefined terms which are accepted a intuitive ideas. These terms are • point, line, and plane. • A point, according to Euclid, is • “that which has no size.” • We usually name points using • capital letters.
All geometric figures consist of points. We usually refer to a line using a Single lower-case letter or Using two points the line contains. The geometric figure suggested by a wall is a Plane.
Definitions • Space is the • Set of all points. • Collinear points are • Points all in one line. • Coplanar points are • Points all in one plane. • The intersection of two figures is • The set of points that are in both figures.
Definitions (cont.) • The term distinct means • Different. • A segment is part of a line with • Two endpoints. • Opposite rays are • Distinct collinear rays with the same endpoint. • Two objects that have the same shape and size are said to be • Congruent.
Definitions (cont.) • Congruent segments are segments • That have equal lengths. • The midpoint of a segment is the point that • Divides the segment into 2 congruent segments. • A bisector of a segment is a line, segment, ray, or plane that • Intersects the segment at its midpoint.
Definitions (cont.) • An angle is the figure formed by • Two rays with the same endpoint. • This endpoint is known as the • Vertex of the angle. • Congruent angles are angles with the • Same measure. • An angle with measure between 0 and 90 is • An acute angle.
Definitions (cont.) • An angle with measure equal to 90 is • A right angle. • An angle with measure between 90 and 180 is • An obtuse angle. • A straight angle is an angle with measure • 180. • Adjacent angles are two angles that have • A common vertex, a common side, but no common interior points.
Postulates • The Ruler Postulate provides a way to find • The distance between two points. • If B is between A and C, then • AB + BC = AC. • The Protractor Postulate provides a means to • Measure angles. • If angle AOC is a straight angle and B is any point not on line AC, then • Measure of angle AOB + measure of angle BOC = 180.
Postulates (cont.) • A line contains at least • Two points, • A plane contains at least • three points not all in one line, and • Space contains at least • Four points not all in one plane. • Through any two points there is • Exactly one line.
Postulates (cont.) • If two points are in a plane, then the line that contains the points • Is in that plane. • If two lines intersect, then their intersection • Is a point. • If two parallel lines are cut by a transversal, then • Corresponding angles are congruent.
Postulates (cont.) • The measure of the arc formed by two adjacent arcs is • The sum of the measures of the two arcs. • The area of a square is the square of the length • Of a side. • The area of a region is the sum of the areas of • Its non-overlapping parts.
