In geometry, we use points to specify exact locations. They are generally denoted by a number or letter. Because points specify a single, exact location, they are zero-dimensional. In other words, points have no length, width, or height. It may be helpful to think of a point as a miniscule "dot" on a piece of paper. Show Points A, B, and C LinesLines in geometry may be thought of as a "straight" line that can be drawn on paper with a pencil and ruler. However, instead of this line being bounded by the dimensions of the paper, a line extends infinitely in both directions. A line is one-dimensional, having length, but no width or height. Lines are uniquely determined by two points. Thus, we denote the name of a line passing through the points A and B as , where the two-headed arrow signifies that the line passes through those unique points and extends infinitely in both directions.Line SegmentsConsider the task of drawing a "straight" line on a piece of paper (as we've done when thinking about lines). What you've actually done is create a line segment. Because our piece of paper has defined dimensions and we cannot draw a line infinitely in any direction, we have constructed a segment that begins somewhere and ends somewhere. We write the name of a line segment with endpoints A and B as . Note that the notation for lines and line segments differ because a line segment has a defined length, whereas a line does not.RaysA ray is a "straight" line that begins at a certain point and extends infinitely in one direction. A ray has one endpoint, which marks the position from where it begins. A ray beginning at the point A that passes through point B is denoted as . This notation shows that the ray begins at point A and extends infinitely in the direction of point B.EndpointsEndpoints mark the beginning or end of a line segment or ray. Line segments have two endpoints, giving them defined lengths, whereas rays only have one endpoint, so the length of a ray cannot be measured. MidpointsThe midpoint of a line segment marks the point at which the segment is divided into two equal segments. In other words, the lengths of the segments from either endpoint to the midpoint are equal. For instance, if M is the midpoint of the segment , then . Note that neither lines nor rays can have midpoints because they extend infinitely in at least one direction. It would be impossible to find the middle of a line or ray that never ends!IntersectionWhen we have lines, line segments, or rays that meet, or cross at a certain point, we call it an intersection point. In other words, those figures intersect somewhere. ParallelTwo lines that will never intersect are called parallel lines. In the case of line segments and rays, we must consider the lines that they lie in. In other words, we must consider the case that the line segments or rays were actually lines that extend infinitely in both directions. If the lines they lie on never intersect, they are called parallel. For instance, the statement " is parallel to ," is expressed mathematically as .
If extended infinitely, the lines above will never meet. TransversalA transversal is a type of line that intersects at least two other lines. The lines that a transversal crosses may or may not be parallel. PlanesA plane can be thought of as a two-dimensional flat surface, having length and width, but no height. A plane extends indefinitely on all sides and is composed of an infinite number of points and lines. One way to think about a plane is as a sheet of paper with infinite length and width. SpaceSpace is the set of all possible points on an infinite number of planes. Thus, space covers all three dimensions - length, width, and height. A line is a straight path on a plane that extends forever in both directions with no endpoints. A line segment is part of a line that has two endpoints and is finite in length. A ray is a line segment that extends indefinitely in one direction.
Point is the basic building block of Geometry. Every shape is made through the combining the points. A small dot marked by a pencil is a point. A point has no length or width. It has no thickness. Point is a mark of position. A point specifies the exact location. Point is denoted by a dot (.) and is named by an alphabet. In the figure above, O is a point as it has a definite mark. Here it indicates this point O is located at the centre of the plane. In the figure below, there is another point A. It is located at right bottom of the plan. RayLet us think of a torch. The light rays come out of it and move away. Let us take example of sun. The rays start from sun and go in all directions and reach to us. In Geometry also, a ray starts from a point and may go to infinity. It has staring point but has no end point. We say a ray has one endpoint and goes without end in one direction. In the figure above, the starts from A and the arrow denotes it can go to infinity. Its length cannot be measured. An unlimited number of rays can be drawn in different directions from a given point The rays coming from torch or sun are examples of rays. This is a ray because a ray has one endpoint and goes without end in one direction LineLook at the figure above. There are arrows on both sides. It indicates it can go further on both sides without end. This is called line. A line goes without end in both directions. Both ends of a line can go to infinity. A line has no end points. The length of a line cannot be measured. A line has no definite length. A line is named by any two points on it and written as line AB or line PQ. One and only one line can be drawn passing through two given points A and B. This line is called AB. It may also be called BA. Line BA is the same as line AB. Both pass through the same two points A and B. An unlimited number of lines can be drawn passing through a given point A. A horizontal line goes straight left or right across. A vertical line goes straight up or down. A diagonal line can be in any direction between horizontal line and vertical line. Line SegmentNow look at the figure above. There is no arrow on any end. It starts from one point and ends at another point. This is called a line segment. A section of a line is a line segment. A line segment has two endpoints. A line segment is a straight line that connects two points. It is the shortest path between the two points. A line segment has definite length. Its length can be measured. Let us mark two small dots (.) by a pencil as points A and B. Let us join them by drawing a straight line. This forms a line segment. A line segment is named by its two endpoints and written as line-segment AB or line-segment PQ. In the figure above, a line segment AB has two end points A and B. It starts from point A and ends at point B. One and only one line-segment can be between two given points A and B. This line-segment is called AB. It may also be called BA. Line BA is the same as line AB. Both pass through the same two points A and B. Line segment can also be a part of a line as in the figure below. A line-segment may be also a part of ray. In the figure below, a line segment AB has two end points A and B. It is a part of a ray starting from A. Parallel linesTwo lines in the same plane either meet or do not meet. If the two lines on a plane meet, we say the two lines intersect and the point where they meet is called point of intersection. If the two lines cannot meet at any point, they are called parallel lines. No two points can be common to two parallel lines. In the figure above, the two lines do not intersect each other. Even if we extend these lines further, they will not touch or meet each other. They are parallel lines. Intersecting linesLet us look at the two lines AB and CD in figure above. They intersect at point O. Hence they are not parallel lines. Point O is the point of their intersection. Concurrent linesThree or more lines passing through the same point on a plane are called concurrent lines. In the figure below, the three lines AB, CD and EF intersect each other at point O. Collinear pointsThree or more points in a plane* are said to be collinear if they all lie on the same line. In the figure above, points A, B and C are on the same line. Hence these three points A, B and C is collinear. *Flat surface is called a plane in Geometry. We can say a piece of paper from our Exercise Book is a plane. Measurement of line segmentA ruler is an instrument used in geometry. We use a ruler to draw a line segment. We use it also to measure length of a line segment. A ruler is generally 1 ft (30 cm) long and is called One foot ruler. Sometime it is simply called scale. Some rulers are six inches (15cm) long and are called half foot ruler. One edge of a ruler has scales marked in inches and the other edge has scales marked in cm. We place the ruler with its edge along the line-segment AB with the zero mark of the ruler at the start point A of the line-segment. We read the mark on the ruler at the other endpoint B of the line-segment. Points to Remember
Questions and AnswersQuestion 1: Draw two points A and B on a paper and draw line-segment. Answer: We mark a Point A on a writing page and then mark another point B on the same Page. We join these two points using a line. This is the line segment. Question 2: Draw two intersecting lines. Answer: We take a ruler and draw a line AB. Then we slightly turn the ruler and draw another line CD in such a way that it passes through any one point of line AB. Question 3: Write two main differences between line and line segment. Answer:
Question 4: Write two key differences between a line and a ray. Answer:
Question 5: What do collinear points mean? Answer: Collinear points are points on the same line. Three or more points in a plane are said to be collinear if they all lie on the same line. Exercise1. Identify the figure below? 2. Identify the figure below? 3. Identify the figure below? 4. Which of the following has a defined length? True or False5. The two lines in the figure below are parallel lines 6. The two lines in the figure below are parallel lines Fill in the blanks7. ………………… has a definite length 8. ………………… has no end points 9. Which of the following is only one end point? 10. Which of the following statements is NOT correct?
|