Hyperbolic geometry was developed independently by Nikolai Lobachevsky, János Bolyai, and Carl Friedrich Gauss in the early 19th century. However, it was Lobachevsky who is credited with first introducing the concept of hyperbolic geometry in his work.
Hyperbolic pressure typically refers to an exaggerated or heightened level of pressure in a given situation or context. It is commonly used to describe intense stress, tension, or urgency.
No; hyperbolic is a term of geometry or cosmology to describe something as having a relationship with a parabola (an infinite three-dimensional curved shape), or in debate to refer to a hyperbole claim or statement which is an overstatement or plausible exaggeration. There is no known application to chemical reactions.
Hyperbole means to exaggerate or to overstate .'Hyperbole' means extravagant exaggeration
Yes, comet C/2017 U1 (PANSTARRS) was the first known interstellar object to pass through our solar system, and it had a hyperbolic trajectory. This means that it was moving fast enough to escape the gravitational pull of the Sun and was not bound to return.
The basic ones are: sine, cosine, tangent, cosecant, secant, cotangent; Less common ones are: arcsine, arccosine, arctangent, arccosecant, arcsecant, arccotangent; hyperbolic sine, hyperbolic cosine, hyperbolic tangent, hyperbolic cosecant, hyperbolic secant, hyperbolic cotangent; hyperbolic arcsine, hyperbolic arccosine, hyperbolic arctangent, hyperbolic arccosecant, hyperbolic arcsecant, hyperbolic arccotangent.
An arc-hyperbolic function is an inverse hyperbolic function.
It works in Euclidean geometry, but not in hyperbolic.
Journal of Hyperbolic Differential Equations was created in 2004.
by creating two planes such that one parallel is hyperbolic and the other parabolic
It is a hyperbolic function.
Bram van Leer has written: 'Multidimensional explicit difference schemes for hyperbolic conservation laws' -- subject(s): Differential equations, Hyperbolic, Hyperbolic Differential equations
Hyperbolic means of or relating to a hyperbole. A hyperbole is an intentional exaggeration; therefore a hyperbolic description is when a person describes something using an obvious exaggeration. For example if you say, "I've told you a million times not to exaggerate."
Hyperbolic geometry was developed independently by Nikolai Lobachevsky, János Bolyai, and Carl Friedrich Gauss in the early 19th century. However, it was Lobachevsky who is credited with first introducing the concept of hyperbolic geometry in his work.
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Hyperbolic functions can be used to describe the position that heavy cable assumes when strung between two supports.
James W. Anderson has written: 'Hyperbolic geometry' -- subject(s): Hyperbolic Geometry