At engineering level technically both process are same except there definition both process give hyperbolic curve in P-V diagram and straight line in T-S diagram. and even in polytropic process PV^n=constant if n=1 then it is not hyperbolic process it is isothermal process even though the definition says pv=c is hyperbolic process.
If the image is erect and equal in size and it does not change its size and nature on moving the mirror closer or away from the object, the mirror is plane mirror. If the image is erect and magnified and it becomes inverted on moving the mirror away from the object, the mirror is concave mirror. If the image is erect and diminished and remains erect on moving the mirror away from the object, the mirror is convex mirror.
A Mirror Character is a character made from a mirror.
The mirror in the mirror was created in 1984.
A concave mirror, or converging mirror, has a reflecting surface that bulges inward (away from the incident light). A convex mirror, fish eye mirror or diverging mirror, is a curved mirror in which the reflective surface bulges toward the light source.
No - HSTs' primary mirror is a Cassegrain Reflector of Ritchey-Chrétien design, which contains a hyperbolic primary/secondary mirror.
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."
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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