Triangle Basics: Cevians, Notations, and Side Conditions

1. Triangle Notation and Terminology

In triangle geometry, understanding notation is the first step:

Capital letters \( A, B, C \) refer to angles or vertices.
Small letters \( a, b, c \) represent the sides opposite those angles:
- \( a = BC \)
- \( b = CA \)
- \( c = AB \)
A line drawn from a vertex to the opposite side is called a Cevian (e.g., \( AD \)).
A line drawn from one side to another side (not passing through a vertex) is called a Side Cut (e.g., \( PQ \)).

Perimeter: \( P = a + b + c \)
Area (using perpendicular): \( Area = \frac{1}{2} \cdot b \cdot h \)

There are three well-known cevians in triangle geometry, each associated with a special point:

Median: Connects a vertex to the midpoint of the opposite side. All medians intersect at the centroid (G).
Altitude: A perpendicular from a vertex to the opposite side. All altitudes meet at the orthocenter (O).
Angle Bisector: Divides the angle into two equal parts. All angle bisectors intersect at the incenter (I).

To form a valid triangle, the sum of the lengths of any two sides must be greater than the third side.

Let’s analyze:

\(\text{AB} + \text{BC} > \text{CA}, \quad \text{BC} + \text{CA} > \text{AB}, \quad \text{CA} + \text{AB} > \text{BC}\)

Consider ordering the sides such that:

\( AB \leq BC \leq CA \)

Now observe:

If \( AB + BC < CA \): Triangle cannot be formed (sum of small sides < largest side).
If \( AB + BC = CA \): Points are collinear (they form a straight line).
If \( AB + BC > CA \): Triangle exists (sum of smaller sides is more than the largest side).

Use uppercase letters for angles/vertices and lowercase for sides.
Cevians are lines from vertex to opposite side – medians, altitudes, and angle bisectors are special cevians.
Always check the triangle inequality: The sum of any two sides must be greater than the third side.

This is a foundational concept that appears across geometry, trigonometry, and even in competitive exams like CAT, SSC, and JEE.

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