[{"@context":"https:\/\/schema.org\/","@type":"Article","@id":"https:\/\/www.relinda.cz\/matematika-a-financni-trhy\/#Article","mainEntityOfPage":"https:\/\/www.relinda.cz\/matematika-a-financni-trhy\/","headline":"Matematika a finan\u010dn\u00ed trhy","name":"Matematika a finan\u010dn\u00ed trhy","description":"Pro sv\u011bt fadingu je m\u00e1lo tak d\u016fle\u017eit\u00fdch osobnost\u00ed, jako je Leonardo Fibonacci. Ve skute\u010dnosti se stal osobnost\u00ed zcela z\u00e1sadn\u00ed, proto\u017ee je po n\u011bm pojmenov\u00e1no hned n\u011bkolik indik\u00e1tor\u016f. P\u0159isp\u011bl se o to p\u0159edev\u0161\u00edm svou posloupnost\u00ed a pom\u011brech. Cel\u00e9 jm\u00e9no tohoto g\u00e9nia zn\u00ed Leonardo Pisano Bigollo a jedn\u00e1 se o italsk\u00e9ho matematika \u017eij\u00edc\u00edho na p\u0159elomu 12. a 13. stolet\u00ed (pravd\u011bpodobn\u011b v letech 1180-1250, ale najdeme i jin\u00e9 \u00fadaje). \u017dil v Pise a za sv\u016fj \u017eivot toho dok\u00e1zal opravdu hodn\u011b. Jedn\u00e1 se o \u00fasp\u011bchy zejm\u00e9na v matematice \u2013 d\u016fkazem m\u016f\u017ee b\u00fdt ji\u017e jmenovan\u00e1 posloupnost \u010di za\u010d\u00e1tek pou\u017e\u00edv\u00e1n\u00ed des\u00edtkov\u00e9 soustavy v Evrop\u011b. Fibonacciho \u010d\u00edsla \u010di posloupnost je v matematice (a nejen v n\u00ed, nach\u00e1z\u00ed se toti\u017e \u00fapln\u011b v\u0161ude kolem n\u00e1s) velmi zn\u00e1m\u00e1. Jedn\u00e1 se o posloupnost 0, 1, 1, 2, 3, 5, 8, 13, 21 atd. Jde tedy o to, \u017ee ka\u017ed\u00e9 dal\u0161\u00ed \u010d\u00edslo v posloupnosti je sou\u010dtem dvou p\u0159ede\u0161l\u00fdch \u010d\u00edslech. A k \u010demu to cel\u00e9 vede? Po vytvo\u0159en\u00ed posloupnosti toti\u017e m\u016f\u017eeme zjistit pom\u011bry \u010di pod\u00edly nazvan\u00e9 jako Fibonacci ratios. Ty vzniknou tak, \u017ee se dv\u011b po sob\u011b jdouc\u00ed \u010d\u00edsla vyd\u011bl\u00ed, \u010d\u00edm\u017e vznikne pom\u011br, kter\u00fd je pak z\u00e1kladn\u00edm stavebn\u00edm prvkem cel\u00e9ho konceptu. P\u0159i obchodov\u00e1n\u00ed Fibonacci forex tak vyu\u017eijeme zejm\u00e9na n\u011bkter\u00e9 z t\u011bchto z\u00edskan\u00fdch \u00farovn\u00ed: 0,382 \u2013 38,2 % 0,618 \u2013 61,8 % 0,786 \u2013 78,6 % 1,618 \u2013 161,8 % 2,618 \u2013 261,8 %. D\u016fle\u017eit\u00e9 v\u0161ak je um\u011bt aplikovat tyto techniky v praxi, \u010demu\u017e napom\u00e1haj\u00ed dostupn\u00e9 platformy, d\u00edky nim\u017e nemus\u00edme nic slo\u017eit\u011b po\u010d\u00edtat, nebo\u0165 dan\u00e9 postupy maj\u00ed v sob\u011b ji\u017e nastaveny. Mezi z\u00e1kladn\u00ed Fibonacciho n\u00e1stroje pat\u0159\u00ed retracement (z\u00e1klad), v\u011bj\u00ed\u0159, \u010dasov\u00e9 z\u00f3ny, oblouky a expanze. Pot\u00e9, co sv\u011bt pochopil d\u016fle\u017eitost a s\u00edlu tohoto postupu, vyvinulo se z t\u011bchto z\u00e1kladn\u00edch n\u00e1stroj\u016f mnoho poupraven\u00fdch, pomoc\u00ed nich\u017e doch\u00e1z\u00ed k detekci v\u00fdznamn\u00e9ho pohybu na burze a aplikaci dan\u00e9ho n\u00e1stroje pro zisk. Ten ud\u00e1v\u00e1, \u017ee vstoup\u00edme do obchodu p\u0159i dan\u00e9 \u00farovni (nap\u0159\u00edklad 38,2 %) a \u010dek\u00e1me do t\u00e9 doby, ne\u017e se zisk ocitne na hranici souvisej\u00edc\u00ed s p\u0159ede\u0161lou hodnotou (zde by to bylo 61,8 %). 4.1\/5 - (7 votes)","datePublished":"2020-08-14","dateModified":"2023-06-14","author":{"@type":"Person","@id":"https:\/\/www.relinda.cz\/author\/#Person","name":"","url":"https:\/\/www.relinda.cz\/author\/","identifier":1,"image":{"@type":"ImageObject","@id":"https:\/\/secure.gravatar.com\/avatar\/f08fec9e5d161146672022190172bcb121f980bd7a64f251ea643f4b19d0f071?s=96&d=mm&r=g","url":"https:\/\/secure.gravatar.com\/avatar\/f08fec9e5d161146672022190172bcb121f980bd7a64f251ea643f4b19d0f071?s=96&d=mm&r=g","height":96,"width":96}},"publisher":{"@type":"Organization","name":"relinda.cz","logo":{"@type":"ImageObject","@id":"\/logo.png","url":"\/logo.png","width":600,"height":60}},"image":{"@type":"ImageObject","@id":"https:\/\/www.relinda.cz\/wp-content\/uploads\/usd-2874026_960_720.jpg","url":"https:\/\/www.relinda.cz\/wp-content\/uploads\/usd-2874026_960_720.jpg","height":0,"width":0},"url":"https:\/\/www.relinda.cz\/matematika-a-financni-trhy\/","about":["Firmy"],"wordCount":389,"articleBody":"   Pro sv\u011bt fadingu je m\u00e1lo tak d\u016fle\u017eit\u00fdch osobnost\u00ed, jako je Leonardo Fibonacci. Ve skute\u010dnosti se stal osobnost\u00ed zcela z\u00e1sadn\u00ed, proto\u017ee je po n\u011bm pojmenov\u00e1no hned n\u011bkolik indik\u00e1tor\u016f. P\u0159isp\u011bl se o to p\u0159edev\u0161\u00edm svou posloupnost\u00ed a pom\u011brech.Cel\u00e9 jm\u00e9no tohoto g\u00e9nia zn\u00ed Leonardo Pisano Bigollo a jedn\u00e1 se o italsk\u00e9ho matematika \u017eij\u00edc\u00edho na p\u0159elomu 12. a 13. stolet\u00ed (pravd\u011bpodobn\u011b v letech 1180-1250, ale najdeme i jin\u00e9 \u00fadaje). \u017dil v Pise a za sv\u016fj \u017eivot toho dok\u00e1zal opravdu hodn\u011b. Jedn\u00e1 se o \u00fasp\u011bchy zejm\u00e9na v matematice \u2013 d\u016fkazem m\u016f\u017ee b\u00fdt ji\u017e jmenovan\u00e1 posloupnost \u010di za\u010d\u00e1tek pou\u017e\u00edv\u00e1n\u00ed des\u00edtkov\u00e9 soustavy v Evrop\u011b.Fibonacciho \u010d\u00edsla \u010di posloupnost je v matematice (a nejen v n\u00ed, nach\u00e1z\u00ed se toti\u017e \u00fapln\u011b v\u0161ude kolem n\u00e1s) velmi zn\u00e1m\u00e1. Jedn\u00e1 se o posloupnost 0, 1, 1, 2, 3, 5, 8, 13, 21 atd. Jde tedy o to, \u017ee ka\u017ed\u00e9 dal\u0161\u00ed \u010d\u00edslo v posloupnosti je sou\u010dtem dvou p\u0159ede\u0161l\u00fdch \u010d\u00edslech. A k \u010demu to cel\u00e9 vede? Po vytvo\u0159en\u00ed posloupnosti toti\u017e m\u016f\u017eeme zjistit pom\u011bry \u010di pod\u00edly nazvan\u00e9 jako Fibonacci ratios. Ty vzniknou tak, \u017ee se dv\u011b po sob\u011b jdouc\u00ed \u010d\u00edsla vyd\u011bl\u00ed, \u010d\u00edm\u017e vznikne pom\u011br, kter\u00fd je pak z\u00e1kladn\u00edm stavebn\u00edm prvkem cel\u00e9ho konceptu.P\u0159i obchodov\u00e1n\u00ed Fibonacci forex tak vyu\u017eijeme zejm\u00e9na n\u011bkter\u00e9 z t\u011bchto z\u00edskan\u00fdch \u00farovn\u00ed:0,382 \u2013 38,2 %0,618 \u2013 61,8 %0,786 \u2013 78,6 %1,618 \u2013 161,8 %2,618 \u2013 261,8 %.D\u016fle\u017eit\u00e9 v\u0161ak je um\u011bt aplikovat tyto techniky v praxi, \u010demu\u017e napom\u00e1haj\u00ed dostupn\u00e9 platformy, d\u00edky nim\u017e nemus\u00edme nic slo\u017eit\u011b po\u010d\u00edtat, nebo\u0165 dan\u00e9 postupy maj\u00ed v sob\u011b ji\u017e nastaveny.Mezi z\u00e1kladn\u00ed Fibonacciho n\u00e1stroje pat\u0159\u00ed retracement (z\u00e1klad), v\u011bj\u00ed\u0159, \u010dasov\u00e9 z\u00f3ny, oblouky a expanze. Pot\u00e9, co sv\u011bt pochopil d\u016fle\u017eitost a s\u00edlu tohoto postupu, vyvinulo se z t\u011bchto z\u00e1kladn\u00edch n\u00e1stroj\u016f mnoho poupraven\u00fdch, pomoc\u00ed nich\u017e doch\u00e1z\u00ed k detekci v\u00fdznamn\u00e9ho pohybu na burze a aplikaci dan\u00e9ho n\u00e1stroje pro zisk. Ten ud\u00e1v\u00e1, \u017ee vstoup\u00edme do obchodu p\u0159i dan\u00e9 \u00farovni (nap\u0159\u00edklad 38,2 %) a \u010dek\u00e1me do t\u00e9 doby, ne\u017e se zisk ocitne na hranici souvisej\u00edc\u00ed s p\u0159ede\u0161lou hodnotou (zde by to bylo 61,8 %).                                                                                                                                                                                                                                                                                                                                                                                          4.1\/5 - (7 votes)        "},{"@context":"https:\/\/schema.org\/","@type":"BreadcrumbList","itemListElement":[{"@type":"ListItem","position":1,"name":"Matematika a finan\u010dn\u00ed trhy","item":"https:\/\/www.relinda.cz\/matematika-a-financni-trhy\/#breadcrumbitem"}]}]