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삼각형의 기본 성질과 종류

삼각형의 기본 요소, 내각의 합이 180도가 되는 법칙, 그리고 변의 길이와 각의 크기에 따라 삼각형을 분류하는 방법을 배웁니다.

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학습 리소스

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신뢰 및 인정


투자자

Y Combinator

미디어 보도

Forbes

Problem

Create a video about triangles.

Step 1: Identify the Parts of a Triangle

A triangle is a closed, flat shape made from 33 straight sides. The 33 sides meet at 33 vertices, and each vertex forms an inside angle.

So every triangle has:

  • 33 sides
  • 33 vertices
  • 33 angles

Step 2: Use the Angle Sum Rule

For every triangle, the measures of the 33 inside angles always add up to 180180^\circ.

If the angles are AA, BB, and CC, then:

A+B+C=180A + B + C = 180^\circ

Step 3: Classify Triangles by Side Lengths

Triangles can be sorted by comparing their side lengths.

A triangle with 33 equal sides is called an equilateral triangle.

A triangle with exactly 22 equal sides is called an isosceles triangle.

A triangle with no equal sides is called a scalene triangle.

Step 4: Classify Triangles by Angle Sizes

Triangles can also be sorted by the sizes of their angles.

A triangle with all angles less than 9090^\circ is called an acute triangle.

A triangle with one 9090^\circ angle is called a right triangle.

A triangle with one angle greater than 9090^\circ is called an obtuse triangle.

Step 5: Describe a Triangle Completely

A triangle can often be described in two ways at the same time: by its side lengths and by its angle sizes.

A complete basic description of a triangle includes its 33 sides, 33 angles, the angle sum rule

A+B+C=180,A + B + C = 180^\circ,

a side-length type, and an angle-size type.

개념

Lines, Line Segments, Rays, and Angles

Identifying and drawing points, line segments (two endpoints), rays (one endpoint extending forever in one direction), and lines (extending forever in both directions). Understanding angle types: a right angle is exactly 90 degrees, an acute angle is less than 90 degrees, and an obtuse angle is greater than 90 degrees.

Triangle Properties and Classification

The interior angles of a triangle always add up to 180°180°. Triangles can be classified by their sides (equilateral, isosceles, scalene) or by their angles (acute, right, obtuse). The triangle inequality states that the sum of any two side lengths must be greater than the third side.

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