Can two unrelated parallel lines intersect Please, everyone, thank you

Two parallel lines certainly cannot intersect. They are two straight lines that complement each other, and one is indispensable! They continue with each other. Never-ending!! Seems to be wondering what you're hinting at.

Parallel lines can never intersect Even if they intersect in different spaces, they are not on the same plane, there is no intersection point If you must make parallel lines intersect, it is only in the wrong case Think about it......

There are two possibilities One, two parallel lines together, that is, they will intersect together for a lifetime. Second, there is a distance between the two parallel lines, that is, they cannot be together for a lifetime. It mainly depends on the person, you can get him together if you want him, if you don't want to, then you can't help it.

Man will conquer the heavens.

The problem of parallel lines alone is that if they are not affected by external forces, they will never intersect.

Not in the same plane can intersect.

If there are two parallel lines, you will not intersect if you extend your term indefinitely.

Your problem itself has logical contradictions, and I can't say it is irrelevant, but it is regarded as a straight line in space, and if it is not three-dimensional, we will be four-dimensional, and we will definitely be able to!

Brain teasers. What line are monkeys most afraid of? Answer: Parallel Lines Because Bananas Never Intersect If you belong to two parallel lines, then you should learn to give up, because sometimes giving up is also a kind of beauty.

There is only one point of intersection, oh, and it's not bad to be a cow wolf and weaver girl.

Let their projections intersect.

You can't intersect planes, but you can intersect in different planes! To put it simply, you can intersect.

Wrong. There is also a possibility that the two lines coincide, so this statement is not true.

For two straight lines that never intersect in the same plane, the methods for determining the parallel lines include: the isotopic angle is equal, and the two straight lines are parallel; The inner staggered angles are equal, and the two straight lines are parallel; The inner angles of the same side are complementary, and the two straight lines are parallel.

If both lines are parallel to the third line, then the two lines are also parallel to each other. It can be shortened to: two straight lines parallel to the same straight line are parallel to each other.

Segment, a general term used in technical drawing, refers to one or more different line elements forming a continuous or discontinuous graphic line, such as a line segment of a solid line or consisting of"Long strokes, short intervals, dots, short intervals, dots, short intervals"A line segment composed of a double-dotted dash.

Connect the two points with a ruler to get a line segment. The length of the line segment is the distance between these two points.

The length of the line segment connecting two points is called the distance between the two points.

A line segment is represented by the letters A, B, or a lowercase letter that denote its two endpoints, and sometimes these letters also indicate the length of the line segment, denoted as line AB or line BA, line A. where a and b represent any two points on a straight line.

No, provided that it is in the same plane.

Within the same plane, two straight lines that do not intersect are parallel lines.

No, there is one less condition, it should be in the same plane, two straight lines that do not intersect are parallel lines.

Wrong. If not in a plane.

No, two straight lines that do not intersect in the same plane are called parallel lines.

In geometry, two straight lines that do not intersect (or coincide) in the same plane are called parallel lines. Parallel lines are an important concept in axiomatic geometry. The axiom of parallelism in Euclidean geometry can be expressed equivalently as "there is a single straight line parallel to a known straight line at a point outside the straight line".

The negative form of "a straight line that is not parallel to a known straight line at a point outside the straight line" or "at least two straight lines parallel to the known straight line at a point outside the straight line" can be used as an alternative to the axiom of parallelism in Euclidean geometry and deduce non-Euclidean geometry independent of Euclidean geometry.

The nature of parallel lines.

1.A little outside the line, you can and can only draw a line parallel to the known line.

2.The two parallel lines are truncated by a third straight line, the isotope angles are equal, the internal misalignment angles are equal, and the lateral internal angles are complementary.

3.When two lines are parallel to the third line, the two lines are parallel.

4.Parallel lines divide triangles into proportional proportions to the corresponding sides.

These propositions rely on the fifth axiom of Euclidean geometry (the axiom of parallelism) and are therefore not valid in non-Euclidean geometry.

A parallel line is two straight lines that do not intersect and are right. Two straight lines that are parallel to each other can never intersect, and if they are parallel, they cannot intersect, but straight lines that do not intersect are not necessarily parallel. Because in space, disjoint lines can be parallel or distant.

The nature of parallel lines.

1. The two parallel lines are truncated by the third straight line, which complement each other with the side inner angle (referred to as "two straight lines are parallel and the side inside angle complements each other").

2. The two parallel lines are truncated by the third straight line, and the internal wrong angles are equal (referred to as "two straight lines are parallel, and the internal wrong angles are equal").

3. Two parallel lines are truncated by a third straight line, and the isotopic angle is equal (referred to as "two straight lines are parallel, and the isotopic angle is equal").

4. There is only one straight line parallel to the straight line (axiom of parallelism).

5. If two straight lines are parallel to each other, the two straight lines are also parallel to each other.

6. The distance between parallel lines is equal everywhere.

If in the same plane, two straight lines must be parallel if they do not intersect; If they are not in the same plane, two straight lines that do not intersect are not necessarily parallel. Therefore, it is not true that two straight lines must be parallel if they do not intersect.

Parallel lines are two straight lines in geometry that never intersect or coincide in the same plane are called parallel lines, and the axiom of parallelism in Euclidean geometry can be equivalent to "there is a single straight line parallel to a known straight line at a point outside the straight line".

Parallel: Two straight lines that do not intersect.