In geometry, certain geometric properties can hold true regardless of how the figures are drawn, leading to aesthetically pleasing and eternal truths.
Specific theorems like Morley's trisector theorem and Napoleon's theorem showcase the magic of geometry by revealing surprising relationships within triangles.
Concepts like Simson's line and ΘiΘeica's 3 circles theorem demonstrate the beauty and elegance of geometry, inspiring us to appreciate the world through the lens of mathematics.
Ballet resembles mathematics, providing a vocabulary of poses and movements like a formal structure in mathematics, enabling endless unique sequences to unfold.
Ballet teaching often uses metaphorical cues to convey precise body positioning, making the basics challenging to teach and learn.
Sensorial metaphors in ballet, like imagining water flowing down arms or peeling a tangerine with feet, enhance mind-body connection and expand awareness beyond just physical movement.
Different languages show a connection between the concept of 'right' as a direction and 'right' as something moral or lawful, indicating a common association in human language across cultures.
The association of 'right' with positive notions and 'left' with negative ones is present not just in language but also in cultural practices, indicating a deep-rooted connection between language, culture, and human behavior.
The preference for associating 'right' with good and 'left' with bad seems to have biological origins related to handedness and how our bodies interact with space, as demonstrated by studies on right- and left-handed individuals.