COSINE$500975$ - translation to ισπανικά
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COSINE$500975$ - translation to ισπανικά

TECHNIQUE REPRESENTING DATA AS SUMS OF COSINE FUNCTIONS
Discrete Cosine Transform; Inverse discrete cosine transform; IDCT; DCT (math); Fast cosine transform; Inverse cosine transform; Fast Cosine Transform; Applications of the discrete cosine transform
  • JPEG DCT]]
  • An example showing eight different filters applied to a test image (top left) by multiplying its DCT spectrum (top right) with each filter.
  • 310x310px
  • 336x336px

COSINE      
Programa europeo que fomenta el uso de redes de comunicación para comunicar diferentes organizaciones de investigación europeas
cosine formula         
  • γ}} is obtuse), expressed with modern algebraic notation.
  • Cosine theorem in plane trigonometry, proof based on Pythagorean theorem.
  • a}}.
  • Fig. 4 – Coordinate geometry proof
PROPERTY OF ALL TRIANGLES ON A EUCLIDEAN PLANE
Cosine law; Cosine rule; Cosine Law; Cosine formula; Cosines law; Cos law; Cos rule; Cosine relation; Cosine theorem; Law of cos; The Law of Cosines; Law of Cosines; Law of cosine; Cosine Rule; Law Of Cosines; Laws of cosines; Al Kashi formula; Al-Kashi's theorem
(n.) = fórmula del coseno
Ex: The author shows that in most practical cases Salton's cosine formula yields a numerical value that is twice Jaccard's index.
Sine         
  • none
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  • Ottoman Turkey]] with axes for looking up the sine and [[versine]] of angles
  • The four quadrants of a Cartesian coordinate system
  • Sine function in blue and sine squared function in red.  The X axis is in radians.
  • sin(''z'') as a vector field
  • This animation shows how including more and more terms in the partial sum of its Taylor series approaches a sine curve.
  • The quadrants of the unit circle and of sin(''x''), using the [[Cartesian coordinate system]]
  • <math>\cos(\theta)</math> and <math>\sin(\theta)</math> are the real and imaginary parts of <math>e^{i\theta}</math>.
  • For the angle ''α'', the sine function gives the ratio of the length of the opposite side to the length of the hypotenuse.
  • Unit circle: a circle with radius one
TRIGONOMETRIC FUNCTIONS OF AN ANGLE
Cosine; Sine function; Sine squared; COSINE; SinX; Sine (trigonometric function); Cosine (trigonometric function); Sin x; Cosinus; Complex sine and cosine; Sin(x); Cos(x); Cosine function; Cosine of X; Sine of X; Sinx; Sinusoida; Sin(); Half chord; Complex sine; Sin z; Sin X; Vertical sine; Sinus rectus (mathematics); Sinus rectus (trigonometry); Sinus rectus (function); Sinus (trigonometry); Half-chord; Sinus rectus arcus; Sinus rectus primus; Sin (trigonometry); Cos (trigonometry); Sine (trigonometry); Sine (mathematics); Natural sine; Algorithms for calculating the sine function; S (trigonometry); Sin. (trigonometry); Draft:Sine and cosine; Sine; Sin and cos; Sinus and cosinus
Seno

Ορισμός

COSINE
Cooperation for Open Systems Interconnection Networking in Europe. A EUREKA project.

Βικιπαίδεια

Discrete cosine transform

A discrete cosine transform (DCT) expresses a finite sequence of data points in terms of a sum of cosine functions oscillating at different frequencies. The DCT, first proposed by Nasir Ahmed in 1972, is a widely used transformation technique in signal processing and data compression. It is used in most digital media, including digital images (such as JPEG and HEIF), digital video (such as MPEG and H.26x), digital audio (such as Dolby Digital, MP3 and AAC), digital television (such as SDTV, HDTV and VOD), digital radio (such as AAC+ and DAB+), and speech coding (such as AAC-LD, Siren and Opus). DCTs are also important to numerous other applications in science and engineering, such as digital signal processing, telecommunication devices, reducing network bandwidth usage, and spectral methods for the numerical solution of partial differential equations.

The use of cosine rather than sine functions is critical for compression since fewer cosine functions are needed to approximate a typical signal, whereas for differential equations the cosines express a particular choice of boundary conditions. In particular, a DCT is a Fourier-related transform similar to the discrete Fourier transform (DFT), but using only real numbers. The DCTs are generally related to Fourier series coefficients of a periodically and symmetrically extended sequence whereas DFTs are related to Fourier series coefficients of only periodically extended sequences. DCTs are equivalent to DFTs of roughly twice the length, operating on real data with even symmetry (since the Fourier transform of a real and even function is real and even), whereas in some variants the input or output data are shifted by half a sample. There are eight standard DCT variants, of which four are common.

The most common variant of discrete cosine transform is the type-II DCT, which is often called simply the DCT. This was the original DCT as first proposed by Ahmed. Its inverse, the type-III DCT, is correspondingly often called simply the inverse DCT or the IDCT. Two related transforms are the discrete sine transform (DST), which is equivalent to a DFT of real and odd functions, and the modified discrete cosine transform (MDCT), which is based on a DCT of overlapping data. Multidimensional DCTs (MD DCTs) are developed to extend the concept of DCT to multidimensional signals. A variety of fast algorithms have been developed to reduce the computational complexity of implementing DCT. One of these is the integer DCT (IntDCT), an integer approximation of the standard DCT,: ix, xiii, 1, 141–304  used in several ISO/IEC and ITU-T international standards.

DCT compression, also known as block compression, compresses data in sets of discrete DCT blocks. DCT blocks sizes including 8x8 pixels for the standard DCT, and varied integer DCT sizes between 4x4 and 32x32 pixels. The DCT has a strong energy compaction property, capable of achieving high quality at high data compression ratios. However, blocky compression artifacts can appear when heavy DCT compression is applied.