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Trading view app projection line

trading view app projection line

This move must be incomplete because BTC reversed the prior three red candle downtrend with the green «hanging man» reversal candle — From what I’ve observed BTC likes to reverse the «hanging man» follow through to the nearest main support or resistance area which in this case should be at the mark — So I dont think this move is complete yet and Hello Traders, here is the full analysis for this pair, let me know in the comment section below if you have any questions, the entry will be taken only if all rules of the strategies will be satisfied. Here the bear is condemned to die for the common good, as a diversionary sacrifice. More Video Ideas. Gold Bullish Bias. Eduational: Example of a descending broadening wedge.

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In mathematicsa projective line is, roughly speaking, the extension of a usual line by a point called a point at infinity. The statement and the proof of many theorems of geometry are simplified by the resultant elimination of special projectioj for example, two distinct projective lines in a projective plane meet in exactly one point there is no «parallel» case. There are many equivalent ways to formally define a projective line; one of the most common is to define a projective line over a field Kcommonly denoted P 1 Kas the set of one-dimensional subspaces of a two-dimensional K — vector space. This definition is a projecton instance of the general definition zpp a projective space. An arbitrary point in the projective line P 1 K may be represented by an equivalence class of homogeneous coordinateswhich take the form of a pair. The projective line may be identified with the line K extended by a point at infinity.

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trading view app projection line
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In mathematicsa projective line is, roughly speaking, the extension of a usual line by a point called a point at infinity. The statement and the proof of many theorems of geometry are simplified by the resultant elimination of special cases; for example, two distinct projective lines in a projective plane meet in exactly one point there is no «parallel» case. There are many equivalent ways to formally define a projective line; one of the most common is to define a projective line over a field Kcommonly denoted P 1 Kas the set of one-dimensional subspaces of a two-dimensional K — vector space.

This definition is a special instance of the general definition of a projective space. An arbitrary point in the projective line P 1 K may be represented by an equivalence class of homogeneous coordinateswhich take the form of a pair. The projective line may be identified with the line K extended by a point at infinity. More precisely, the line K may be identified with the subset of P 1 K given by.

This subset covers all points in P 1 K except one, which is called the point at infinity :. This allows to extend the arithmetic on K to P 1 K by the formulas. The projective line over the real numbers is called the real projective line. An example is obtained by projecting points in R 2 onto the unit circle and then identifying diametrically opposite points.

Adding a point at infinity to the complex plane results in a space that is topologically a sphere. Hence the complex projective line is also known as the Riemann sphere or sometimes the Gauss sphere.

It is in constant use in complex analysisalgebraic geometry and complex manifold theory, as the simplest example of a compact Riemann surface. In all other respects it is no different from projective lines defined over other types of fields. Quite generally, the group of homographies with coefficients in K acts on the projective line P 1 K.

This group action is transitiveso that P 1 K is a homogeneous space for the group, often written PGL 2 K to emphasise the projective nature of these transformations. Transitivity says that there exists a homography that will transform any point Q to any other point R. The point at infinity on P 1 K is therefore an artifact of choice of coordinates: homogeneous coordinates. This amount of specification ‘uses up’ the three dimensions of PGL 2 K ; in other words, the group action is sharply 3-transitive.

The computational aspect of this is the cross-ratio. Indeed, a generalized converse is true: a sharply 3-transitive group action is always isomorphic to a generalized form of a PGL 2 K action on a projective line, replacing «field» by «KT-field» generalizing the inverse to a weaker kind of involutionand «PGL» by a corresponding generalization of projective linear maps.

The projective line is a fundamental example of an algebraic curve. From the point of view of algebraic geometry, P 1 K is a non-singular curve of genus 0. If K is algebraically closedit is the unique such curve over Kup to rational equivalence. In general a non-singular curve of genus 0 is rationally equivalent over K to a conic Cwhich is itself birationally equivalent to trading view app projection line line if and only if C has a point defined over K ; geometrically such a point P can be used as origin to make explicit the birational equivalence.

The function field of the projective line is the field K T of rational functions over Kin a single indeterminate T. Any function field K V of an algebraic variety V over Kother than a single point, has a subfield isomorphic with K T. From the point of view of birational geometrythis means that there will trading view app projection line a rational map from V to P 1 Kthat is not constant.

This is the beginning of methods in algebraic geometry that are inductive on dimension. The rational maps play a role analogous to the meromorphic functions of complex analysisand indeed in the case of compact Riemann surfaces the two concepts coincide. If V is now taken to be of dimension 1, we get a picture of a typical algebraic curve C presented ‘over’ P 1 K.

Assuming C is non-singular which is no loss of generality starting with K Cit can be shown that such a rational map from C to P 1 K will in fact be everywhere defined. That is not the case if there are singularities, since for example a double point where a curve crosses itself may give an indeterminate result after a rational map. This gives a picture in which the main geometric feature is ramification. Many curves, for example hyperelliptic curvesmay be presented abstractly, as ramified covers of the projective line.

According to the Riemann—Hurwitz formulathe genus then depends only on the type of ramification. A rational curve is a curve that is birationally equivalent to a projective line see rational variety ; its genus is 0.

A rational normal curve in projective space P n is a rational curve that lies in no proper linear subspace; it is known that there is only one example up to projective equivalence[2] given parametrically in homogeneous coordinates as. See twisted cubic for the first interesting case. From Wikipedia, the free encyclopedia. This article needs additional citations for verification. Please help improve this article by adding citations to reliable sources.

Unsourced material may be challenged and removed. Main article: real projective line. Topics in algebraic curves. Five points determine a conic Projective line Rational normal curve Riemann sphere Twisted cubic.

Elliptic function Elliptic integral Fundamental pair of periods Modular form. Counting points on elliptic curves Division polynomials Hasse’s theorem on elliptic curves Mazur’s torsion theorem Modular elliptic curve Modularity theorem Mordell—Weil theorem Nagell—Lutz theorem Supersingular elliptic curve Schoof’s algorithm Schoof—Elkies—Atkin algorithm.

Elliptic curve cryptography Elliptic curve primality. De Franchis theorem Faltings’s theorem Hurwitz’s automorphisms theorem Hurwitz surface Hyperelliptic curve. Dual curve Polar curve Smooth completion. Acnode Crunode Cusp Delta invariant Tacnode. Birkhoff—Grothendieck theorem Stable vector bundle Vector bundles on algebraic curves. Categories : Algebraic curves Projective geometry. Hidden categories: Articles needing additional references from December All articles needing additional references.

Namespaces Article Talk. Views Read Edit View history. By using this site, you agree to the Terms of Use and Privacy Policy. Analytic theory Elliptic function Elliptic integral Fundamental pair of periods Modular form. Divisors on curves Abel—Jacobi map Brill—Noether theory Clifford’s theorem on special divisors Gonality of an algebraic curve Jacobian variety Riemann—Roch theorem Weierstrass point Weil reciprocity law.

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Market turns are connected by the Fibonacci sequence time cycle. More Scripts. If you have any questions about this trade or my strategies feel free to ask them in the comment section below! More Futures. Credit to him for the suggestion. What about that Linear Regression? Got it. So many people are calling the bottom right now, but the big picture analysis says that the bottom is NOT in. Good Luck!!!!!!!!!!! History Repeats. Futures Ideas.

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