What is a straight beam? Subject: Point. Curved line. Straight line. Line segment. Ray

A point and a straight line are the basic geometric figures on a plane.

The ancient Greek scientist Euclid said: “a point” is something that has no parts.” The word "point" translated from Latin language means the result of an instant touch, a prick. A point is the basis for constructing any geometric figure.

A straight line or simply a straight line is a line along which the distance between two points is the shortest. A straight line is infinite, and it is impossible to depict the entire straight line and measure it.

Points are denoted by capital Latin letters A, B, C, D, E, etc., and straight lines by the same letters, but lowercase a, b, c, d, e, etc. A straight line can also be denoted by two letters corresponding to points lying on her. For example, straight line a can be designated AB.

We can say that points AB lie on line a or belong to line a. And we can say that straight line a passes through points A and B.

The simplest geometric figures on a plane are a segment, a ray, broken line.

A segment is a part of a line that consists of all points of this line, limited by two selected points. These points are the ends of the segment. A segment is indicated by indicating its ends.

A ray or half-line is a part of a line that consists of all points of this line lying on one side of a given point. This point is called the starting point of the half-line or the beginning of the ray. The beam has a starting point, but no end.

Half-lines or rays are designated by two lowercase Latin letters: the initial and any other letter corresponding to a point belonging to the half-line. In this case, the starting point is placed in the first place.

It turns out that the straight line is infinite: it has neither beginning nor end; a ray has only a beginning, but no end, but a segment has a beginning and an end. Therefore, we can only measure a segment.

Several segments that are sequentially connected to each other so that the segments (neighboring) that have one common point are not located on the same straight line represent a broken line.

A broken line can be closed or open. If the end of the last segment coincides with the beginning of the first, we have a closed broken line; if not, it is an open line.

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We all once studied geometry at school, but not all of us remember what a segment is. And even more so, few people can explain the concept of rays and how they are designated. Let's try in this article to remind ourselves of these definitions and consider them in mathematics. We will also define what a beam is and how it differs from light. If you get into it, it won't be difficult to understand.

Definition of concepts

First, let's remember what is called geometry. Geometry is a branch of mathematics that studies geometric figures and their properties. These include triangle, square, rectangle, parallelepiped, circle, oval, rhombus, cylinder, etc. The simplest figure- this is a straight line. It is endless and has no beginning. Two lines will intersect at only one the only point. Countless straight lines can be drawn through one point. Every point on a line divides it into two.

It consists of points located on one side. All concepts of these subsets can be named this way. The ray is denoted by one lowercase Latin letter or two capital letters, when one point is the beginning (for example, O), and the second lies on it (for example, F, K and E).

A geometric figure with angles is based on half-lines. They start at the point where they intersect, but the other side is directed to infinity. The beginning divides the line into 2 parts. In writing it is usually referred to as two capitals (OF) or one Latin letter (a, b, c). If a straight line is given, then OB is written in rounded brackets: (OB). If this is a segment - in square brackets.

Thus, a ray is part of a straight line. Through any point you can draw many straight lines, but through 2 non-coinciding ones - only one. The latter can interact only in three ways: intersect, cross, or be parallel to each other. Exist linear equations, which define a straight line on the plane.

Notation in geometry

There are several designation options:

Need to know: What is and horizontal position?

The difference between light rays and geometric ones

In geometry, these concepts are very similar. A ray is a line, but it is the energy of light. In other words, it is a small beam of light. In optics this concept, like the concept of a straight line, is basic in geometry. The light does not have a concentrated direction, diffraction occurs. But when the light flux is very strong, divergence is neglected and a clear direction can be identified.

Point O splits line AB into two parts. What does each part resemble? How does each part differ from a straight line and a segment?

1) Each of the parts resembles a ray.

2) The ray has a starting point, but no end point. A segment has a starting and ending point. A straight line has neither a start nor an end point.

Mark the beginning of each ray with a colored pencil. How is the first ray designated? Is it possible to swap letters? Why? Label the remaining rays.

The beam is designated: the first letter is the starting point of the beam, the second is the end.

Letters cannot be interchanged, because the first letter indicates the beginning of the beam.

a) Pick it up correct names for drawings and draw lines:

b) Draw a straight line, a ray and a segment in your notebook and label them.

Solution

Using a ruler, trace the straight lines in the drawing with a red pencil, the rays with blue, and the segments with green:

closed if its beginning and end are at the same point,
open if its beginning and end are not connected

closed lines

open lines

self-intersecting
without self-intersections

self-intersecting lines

lines without self-intersections

straight lines

broken lines

curved lines

A straight line is a line that is not curved, has neither beginning nor end, it can be continued endlessly in both directions

Even when a small section of a straight line is visible, it is assumed that it continues indefinitely in both directions

Indicated by a lowercase (small) Latin letter. Or two capital (capital) Latin letters - points lying on a straight line

straight line a

Direct may be

intersecting if they have a common point. Two lines can intersect only at one point.
- perpendicular if they intersect at right angles (90°).
Parallel, if they do not intersect, do not have a common point.

parallel lines

intersecting lines

perpendicular lines

A ray is a part of a straight line that has a beginning but no end; it can be continued indefinitely in only one direction

The ray of light in the picture has its starting point as the sun.

A point divides a straight line into two parts - two rays A A

The beam is designated by a lowercase (small) Latin letter. Or two capital (capital) Latin letters, where the first is the point from which the ray begins, and the second is the point lying on the ray

The rays coincide if

located on the same line,
start at one point
directed in one direction

rays AB and AC coincide

rays CB and CA coincide

A segment is a part of a line that is limited by two points, that is, it has both a beginning and an end, which means its length can be measured. The length of a segment is the distance between its starting and ending points

Through one point you can draw any number of lines, including straight lines

Through two points - an unlimited number of curves, but only one straight line

curved lines passing through two points

straight line AB

A piece was “cut off” from the straight line and a segment remained. From the example above you can see that its length is the shortest distance between two points.

✂ B A ✂
A segment is denoted by two capital (capital) Latin letters, where the first is the point at which the segment begins, and the second is the point at which the segment ends

segment AB

A broken line is a line consisting of consecutively connected segments not at an angle of 180°

A long segment was “broken” into several short ones

The links of a broken line (similar to the links of a chain) are the segments that make up the broken line. Adjacent links are links in which the end of one link is the beginning of another. Adjacent links should not lie on the same straight line.

The vertices of a broken line (similar to the tops of mountains) are the point from which the broken line begins, the points at which the segments that form the broken line are connected, and the point at which the broken line ends.

A broken line is designated by listing all its vertices.

broken line ABCDE

vertex of polyline A, vertex of polyline B, vertex of polyline C, vertex of polyline D, vertex of polyline E

broken link AB, broken link BC, broken link CD, broken link DE

link AB and link BC are adjacent

link BC and link CD are adjacent

link CD and link DE are adjacent

The length of a broken line is the sum of the lengths of its links: ABCDE = AB + BC + CD + DE = 64 + 62 + 127 + 52 = 305

A polygon is a closed polyline

The sides of the polygon (it will help you remember the expressions: “go in all four directions”, “run towards the house”, “which side of the table will you sit on?”) are the links of a broken line. Adjacent sides of a polygon are adjacent links of a broken line.

The vertices of a polygon are the vertices of a broken line. Adjacent vertices are the endpoints of one side of the polygon.

A polygon is denoted by listing all its vertices.

closed polyline without self-intersection, ABCDEF

polygon ABCDEF

polygon vertex A, polygon vertex B, polygon vertex C, polygon vertex D, polygon vertex E, polygon vertex F

vertex A and vertex B are adjacent

vertex B and vertex C are adjacent

vertex C and vertex D are adjacent

vertex D and vertex E are adjacent

vertex E and vertex F are adjacent

vertex F and vertex A are adjacent

polygon side AB, polygon side BC, polygon side CD, polygon side DE, polygon side EF

side AB and side BC are adjacent

side BC and side CD are adjacent

CD side and DE side are adjacent

side DE and side EF are adjacent

side EF and side FA are adjacent

A B C D E F 120 60 58 122 98 141

The perimeter of a polygon is the length of the broken line: P = AB + BC + CD + DE + EF + FA = 120 + 60 + 58 + 122 + 98 + 141 = 599

A polygon with three vertices is called a triangle, with four - a quadrangle, with five - a pentagon, etc.

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Basics of geometry

Geometry is a branch of mathematics that studies geometric figures and their properties.

Let's get acquainted with the basic geometric concepts studied in primary school.

A point is the basic and simplest geometric figure.

In geometry, a point is designated by a capital Latin letter or number. Many Latin letters are written similar to English letters.

In the text, a point is designated by the following symbol: “(·) A” - point “A”.

A straight line is the simplest geometric figure that has neither beginning nor end.

The words “has neither beginning nor end” indicate that the line is infinite.

Through two points you can draw a single straight line.
Two lines can intersect only at one point.
An infinite number of straight lines can be drawn through one point.

Ways to designate straight lines

Lowercase Latin letter:

Two capital Latin letters if these letters indicate points located on a straight line.

A ray is a part of a straight line that is located on one side of a point. The ray has a beginning, but no end.

Ways to designate rays

Lowercase Latin letter:

Two capital Latin letters in the case when the first point is the beginning of the ray, and the second point lies on the ray.

A segment is a part of a straight line that is bounded by two points (ends of the segment). A segment has both a beginning and an end.

The main property of a segment is its length.

The length of a segment is the distance between its ends.

In mathematics, a segment is denoted by capital letters.

A polyline is a geometric figure consisting of points that are connected by segments.

The vertices of a polyline are the points at which the segments that form the polyline are connected.

The links of a polyline are segments of a polyline.

In mathematics, a broken line is denoted in capital Latin letters.

Broken ABCD.
The vertices of the broken line are A, B, C, D.
The links of the polyline are AB, BC, CD.

To find the length of a broken line, you need to add up the lengths of all its links (segments) of which it consists.

KLCM = KL + LC + CM = 3 cm + 2 cm + 2 cm = 7 cm

This is how we met basics of geometry. Now we are ready to consider the equally important geometric figure- corner. To do this, go to the next page by clicking on the “View topic content” button at the top of the page.

Dot. Line segment. Ray. Straight. Number line

We will look at each of the topics, and at the end there will be tests on the topics.

Point in mathematics

What is a point in mathematics? A mathematical point has no dimensions and is designated by capital letters: A, B, C, D, F, etc.

In the figure you can see an image of points A, B, C, D, F, E, M, T, S.

Segment in mathematics

What is a segment in mathematics? In mathematics lessons you can hear the following explanation: a mathematical segment has a length and ends. A segment in mathematics is the set of all points lying on a straight line between the ends of the segment. The ends of the segment are two boundary points.

In the figure we see the following: segments ,,,, and , as well as two points B and S.

Direct in mathematics

What is a straight line in mathematics? The definition of a straight line in mathematics is that a straight line has no ends and can continue in both directions indefinitely. A line in mathematics is denoted by any two points on a line. To explain the concept of a line to a student, you can say that a line is a segment that does not have two ends.

The figure shows two straight lines: CD and EF.

Beam in mathematics

What is a ray? Definition of a ray in mathematics: a ray is a part of a line that has a beginning and no end. The name of the beam contains two letters, for example, DC. Moreover, the first letter always indicates the starting point of the beam, so letters cannot be swapped.

The figure shows the rays: DC, KC, EF, MT, MS. Beams KC and KD are one beam, because they have general beginning.

Number line in mathematics

Definition of a number line in mathematics: a line whose points mark numbers is called a number line.

The figure shows the number line, as well as the ray OD and ED

Basic geometric shapes

TO basic geometric shapes on the plane relate dot And straight line. Line segment, Ray, broken line- the simplest geometric figures on a plane.

The point is the smallest geometric figure, which is the basis of all other constructions (figures) in any image or drawing.

Any more complex geometric figure is a set points who have a certain property, characteristic only for this figure.

A straight line, or straight line, can be thought of as an infinite number of points, which are located on one line that has neither beginning nor end. On a piece of paper we see only part of a straight line, since it is infinite. The straight line is depicted like this:

Part straight line, bounded on both sides dots, is called a line segment, or line segment. The segment is depicted like this:

A beam is a directed half-line that has point beginning and has no end. The beam is depicted like this:

If on straight you put point, then this point splits the straight line into two beam, oppositely directed. Such rays are called additional.

The broken line is several segments, interconnected so that the end of the first segment is the beginning of the second segment, and the end of the second segment is the beginning of the third segment, etc., while adjacent (having one common point) the segments are not located on the same straight line. If the end of the last segment does not coincide with the beginning of the first, then such a broken line is called open.

Above is a three-link broken line.

If the end of the last segment of a broken line coincides with the beginning of the first segment, then such a broken line is called closed. An example of a closed polyline is any polygon:

Four-link closed polyline - quadrilateral

Three-link closed polyline - triangle

A plane, like a straight line, is a primary concept that has no definition. A plane, like a straight line, cannot see either the beginning or the end. We consider only the part of the plane that is limited by a closed polyline.

Example plane is the surface of your desktop, a notebook sheet, any smooth surface. The plane can be depicted as shaded
geometric figure:

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Along with such concepts as point, segment, line, there is one more concept in geometry. It is called ray. A ray is a part of a straight line, limited on one side by a point, and on the other side - infinite, i.e. not limited by anything. An analogy can be drawn with nature. For example, a beam of light that we can direct from earth into space. On the one hand it is limited, but on the other hand it is not. Each ray has one extreme point at which it begins. It is called.

beginning of the ray If we take an arbitrary straight line a , and mark some point on it, then this point will split our line into two parts. Each of which will be a ray. Point O will belong to each of these rays. Point O will be at in this case the beginning of these two rays.

The beam is usually designated by one Latin letter. The figure below shows ray k.

You can also denote a ray with two large in Latin letters. In this case, the first of them is the point at which the beginning of the beam lies. The second is the point that belongs to the ray, or in other words, through which the ray passes.

The figure shows the OS beam.

Another way to designate a ray is to indicate the starting point of the ray and the line to which this ray belongs. For example, the figure below shows the ray Ok.

Sometimes they say that the ray comes from point O. This means that point O is the beginning of the ray. Rays are also sometimes called semi-straight.

Task:

Draw a straight line and mark points A B on it and mark point C on segment AB. Among the rays AB, BC, CA, AC and BA, find pairs of coinciding rays.

The rays coincide if they lie on the same straight line and have a common origin and none of them is a continuation of another ray.
The figure shows that these conditions are met by rays AB and AC, as well as rays BC and BA. Therefore, they are coincident.