ramlal says its the difference between the maxima and the minima.
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Caffeine having different wavelents it having 2 maximas and 1 minima. 1st maxima is 205nm 2nd maxima is 273nm minima is 245nm and it is primary reference standard and also suggested in pharmacopiea.
-Rajesh,Orchid
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Caffeine having different wavelents it having 2 maximas and 1 minima. 1st maxima is 205nm 2nd maxima is 273nm minima is 245nm and it is primary reference standard and also suggested in pharmacopiea.
-Rajesh,Orchid
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A polynomial of degree 4 can have up to 3 local maxima/minima.
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Plot the function. You may have found an inflection point.
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The highest parts are the peaks, and the lowest points are the troughs. These could also be described as maxima and minima.
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A straight line has no turning points and so no local maxima or minima. The line has a maximum at + infinity and a minimum at - infinity if m > 0 and conversely if m < 0.
When m = 0, the line is horizontal and so has no maximum or minimum. ([Alternatively, every point on the line is simultaneously a maximum and a minimum.]
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If the degree of the polynomial is odd, the range is all real numbers - for example, y = x5.
If the degree is even, use derivatives to find maxima or minima. You learn about derivatives, maxima and minima in any basic calculus course. Example:
y = x4 - 3x3
Take the derivative:
y' = 4x3 - 9x2
Solve for zero:
4x3 - 9x2 = 0
This will give you two maxima or minima; in this case, check at which of these points the function has the smallest value. Because of the positive coefficient of the leading term, the function values go from this point all the way to plus infinity.
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There are quadratic functions and irrational functions and fractional functions and exponential functions and also finding maxima and minima
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Not a constant, but the differential, i.e. gradient, of the equation. It = 0 at maxima and minima, where the curve is at its turning-point(s).
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I believe the correct term is "extrema" not "extreme." But anyway, extrema are the lowest or highest points on a graph. All other points are higher than the minima, and all other points are lower than the maxima.
In the graph y=x2, (0, 0) is the minima because that is the lowest extent of the range of that graph. There is no maxima because the y value will increase to infinity.
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Takayuki Kawada has written:
'Asymptotic behavior of the maxima over high levels for a homogenous Gaussian random fields' -- subject(s): Asymptotic expansions, Gaussian processes, Maxima and minima, Random fields
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Give me ann example of a BSECE related problem that can be solve numerically
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A horizontal line has a slope of zero. Also, a curve on its lowest and highest points (local maxima or local minima) normally has a slope of zero at such a point.
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Pertti Lehto has written:
'On fourth-order homogeneous functionals in the class of bounded univalent functions' -- subject(s): Functionals, Maxima and minima, Univalent functions
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Igor Vladimirovich Girsanov has written:
'Lectures on mathematical theory of extremum problems' -- subject(s): Functional analysis, Mathematical optimization, Maxima and minima
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It depends what the wavelength and frequency of the wave is. The wavelength is the distance between either two minima, or two maxima.
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Caffeine having different wavelents it having 2 maximas and 1 minima. 1st maxima is 205nm 2nd maxima is 273nm minima is 245nm and it is primary reference standard and also suggested in pharmacopiea.
-Rajesh,Orchid
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Optimization problems that involve finding the maxima or minima of functions also involve taking the first derivative of the function and finding locations where the value of the first derivative is equal to zero (by setting f'(x) = 0). The locations are either maxima, minima, or points of inflection and a second derivative test can be used to determine which of the three was found (max: f''(x) < 0, min: f''(x) > 0, PoI: f''(x) = 0).
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First select the simple template "Minima"
Why you should select Minima??
Because minima template is easy to modify.You can totally customize it and transform it into new template.
Have a look at www.bloggingtips.co.in where I have customized the minima template
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In general, true tides hit two maxima and two minima per day, i.e. 2 'high tides' and 2 'low tides' in 24 hours.
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S. Simons has written:
'Minimax and monotonicity' -- subject(s): Monotone operators, Monotonic functions, Duality theory (Mathematics), Maxima and minima
'Health Emergencies (Health & Social Care)'
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Werner Bergman has written:
'Angular light scattering maxima and minima in monodisperse and heterodisperse systems of spheres' -- subject(s): Dispersion, Light, Particle size determination, Scattering, Tables
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There are lots of applications of calculus; for example: calculating maxima and minima, analyzing the shape of curves, calculating acceleration when you know the velocity, calculating velocity when you know the acceleration; calculating the area of figures; calculating the volume of 3D shapes; etc.
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Among other things, typically you will look for:* Maxima and minima.
* Inflection points (also found with calculus).
* Regions where the graph goes upwards, and regions where it goes downwards.
All of these can be found using calculus.
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sustained interference patter is the pattern in which positions of maxima and minima remains fixed all along the slits.
conditions for sustained interference are
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The correct spelling of the noun is indeed "minima" (the plural of the noun minimum).
The similar adjective is "minimal" (having the smallest degree or amount).
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The intensity of the maxima and minima in Young's double slit experiment will decrease by half when one of the slits is covered by a transparent paper that transmits only half of the light intensity. This is due to the reduced amount of light passing through the slit, resulting in a weaker interference pattern with lower contrast between the bright and dark fringes.
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Well...
When you define a function, you're supposed to give it's domain and a set containing it's range with the definition.
Sometimes these are implicit.
For example, for the function square root, one assumes that the domain is the positive real numbers.
The range is then also the positive real numbers.
Generally, the easyest way to do it for an easy function is to draw a picture.
If you're working with real to real functions, you just have to break the function into continuous pieces, and find the maximum and minimum of each piece. The range is then the union of all the intervals between the maxima and minima (it can be open intervals if the function tends asymptotically to it's maxima or minima without reaching them)
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Monochromatic light is used in interference experiments because it consists of a single wavelength, which helps in producing well-defined interference patterns with distinct maxima and minima. This simplifies the analysis of interference effects and allows for precise measurements of parameters such as wavelength and slit separation.
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Vincenzio Viviani has written:
'De maximis et minimis, geometrica divinatio' -- subject(s): Maxima and minima
'Vincentii Viviani ... Enodatio problematvm vniversis geometris propositorvm a clarissimo' -- subject(s): Geometry, Early works to 1800, Trisection of angle
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Yes.
If you find 2 relative minima and the function is continuous, there must be exactly one point between these minima with the highest value in that interval. This point is a relative maxima.
Think of temperature for example (it is continuous).
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Maxima mean...(put definition) its a way to put maxima in a sentence
or
what does maxima mean?
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Wilfred Kaplan has written:
'Elements of ordinary differential equations' -- subject(s): Differential equations
'Maxima and minima with applications' -- subject(s): Mathematical optimization, Maxima and minima
'Lectures on functions of a complex variable' -- subject(s): Functions of complex variables
'A first course in functions of a complex variable' -- subject(s): Functions of complex variables
'Advanced calculus for engineers and physicists' -- subject(s): Calculus, Vector analysis
'Introduction to analytic functions' -- subject(s): Analytic functions
'Advanced calculus' -- subject(s): Calculus
'Operational methods for linear systems' -- subject(s): Operational Calculus, Linear systems, Lending library
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Janusz S. Kowalik has written:
'\\' -- subject(s): Analytic functions, Computer programs, Maxima and minima, Numerical calculations, SKB II/P3
'Supercomputing (Nato Asi Series F : Computer and System Sciences, Vol 62)'
'Parallel MIMD Computation'
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A minimum value (of any function, not just a polynomial) is a value that has a lower value than any nearby value. A global minimum is a value that is lower than ANY other value. (This answer is just a brief and informal overview; check the Wikipedia article on "maxima and minima" for a more detailed explanation.)
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