Euclid — "An obtuse angle is an angle greater than a right angle."
An obtuse angle is an angle greater than a right angle.
An obtuse angle is an angle greater than a right angle.
Click any product to generate a realistic preview. Up to 3 at a time.
* Initial load can take up to 90 seconds — revising the preview in another color is nearly instant.
"The postulates are not self-evident, but they are necessary for the development of geometry."
"And the greater is a multiple of the less when it is measured by the less."
"A straight line is a line which lies evenly with the points on itself."
"Of quadrilateral figures, a square is that which is both equilateral and right-angled; an oblong that which is right-angled but not equilateral; a rhombus that which is equilateral but not right-angle…"
"A circle is a plane figure contained by one line such that all the straight lines falling upon it from one point among those lying within the figure are equal to one another."
Found in 2 providers: deepseek,grok
2 sources checked
An obtuse angle is any angle wider than 90 degrees but less than a straight 180-degree line. Think of scissors opened past a perfect square corner. The statement is a precise geometric definition, distinguishing one class of angles from acute (smaller than 90°) and right angles exactly. It gives geometry a shared, unambiguous vocabulary so that reasoning built on top of it cannot slip into vagueness or disagreement.
This line appears nearly verbatim in Book I of Euclid's Elements, his foundational treatise written around 300 BCE. Euclid structured all of geometry on definitions first, then postulates, then proofs — nothing was assumed until named. This reflects his core conviction that rigorous mathematics requires airtight, shared language before a single theorem can stand. His character was methodical and relentlessly precise; he reportedly told Ptolemy I there is no royal road to geometry.
Euclid worked in Alexandria around 300 BCE during the Hellenistic period, when Ptolemy I built the Library of Alexandria to systematize Greek knowledge. Plato's Academy had elevated mathematics as the purest form of reasoning, but geometry still lacked a single, logically ordered reference. Competing definitions created confusion across city-states. Euclid's precise vocabulary unified the discipline, giving scholars from Egypt to Rome a common mathematical language that dominated education for over two thousand years.
AI-generated insights based on extensive research and information for context. Factual errors? Email [email protected].
Your cart is empty