Euclid — "If a straight line be drawn from the ends of a straight line, it will be a trian…"
If a straight line be drawn from the ends of a straight line, it will be a triangle.
If a straight line be drawn from the ends of a straight line, it will be a triangle.
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"If four magnitudes be proportional, the rectangle contained by the extremes is equal to the rectangle contained by the means."
"A diameter of the circle is any straight line drawn through the center and terminated in both directions by the circumference of the circle, and such a straight line also bisects the circle."
"The elements of geometry are derived from a small set of axioms and postulates."
"To produce a finite straight line continuously in a straight line."
"Parallelograms which are on the same base and in the same parallels are equal to one another."
Paraphrased from implications within 'Elements', not a direct definition.
Date: c. 300 BCE
WisdomFound in 1 providers: grok
1 source checked
Take any straight line segment. Draw one new line from each of its two endpoints so they meet at a single point — the result is a triangle. The quote states a construction principle: three connected segments enclosing a space with three corners. It reduces a fundamental shape to its minimal generating action, requiring nothing beyond two lines and a meeting point. No fluff, no measurement — just the condition that makes a triangle exist.
Euclid built all of geometry from the ground up in his Elements, starting with bare definitions before proving anything. This phrasing is pure Euclid: strip every shape to its essential construction rule, state it once, and move on. He taught in Alexandria under Ptolemy I, insisting even the king had to follow the logical sequence — no shortcuts. The spare, axiomatic tone here reflects a man who believed truth emerges from the fewest necessary conditions, not from intuition.
Around 300 BCE, Alexandria under Ptolemy I had become the Mediterranean's intellectual hub. Greek thinkers were radically departing from Egyptian and Babylonian geometry, which was practical — measuring fields, calculating grain. Greeks asked what shapes fundamentally are, not just how to use them. Euclid's formal definitions were a cultural statement: abstract reasoning, not craftsman measurement, was the highest form of knowledge. His Elements codified that shift, making deductive proof the standard for two thousand years of Western mathematics.
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