UTF-8 encoding table and Unicode characters

page with code points U+2190 to U+228F

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language German · English
code positions per page 128 · 256 · 512 · 1024
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UTF-8 encoding		 hex. · decimal · hex. (0x) · octal · binary · for Perl string literals · One Latin-1 char per byte · no display
Unicode character names not displayed · displayed · also display deprecated Unicode 1.0 names
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numerical HTML encoding
of the Unicode character		 not displayed · decimal · hexadecimal
HTML 4.0 character entities displayed · not displayed
Unicode
code point		 character UTF-8
(chars)		 append character
to accumulator		 HTML 4.0 character entities numerical HTML encoding
of the Unicode character		 name
U+2190←append← ← LEFTWARDS ARROW
U+2191↑append↑ ↑ UPWARDS ARROW
U+2192→append→ → RIGHTWARDS ARROW
U+2193↓append↓ ↓ DOWNWARDS ARROW
U+2194↔append↔ ↔ LEFT RIGHT ARROW
U+2195↕append ↕ UP DOWN ARROW
U+2196↖append ↖ NORTH WEST ARROW
U+2197↗append ↗ NORTH EAST ARROW
U+2198↘append ↘ SOUTH EAST ARROW
U+2199↙append ↙ SOUTH WEST ARROW
U+219A↚append ↚ LEFTWARDS ARROW WITH STROKE
U+219B↛append ↛ RIGHTWARDS ARROW WITH STROKE
U+219C↜append ↜ LEFTWARDS WAVE ARROW
U+219D↝append ↝ RIGHTWARDS WAVE ARROW
U+219E↞append ↞ LEFTWARDS TWO HEADED ARROW
U+219F↟append ↟ UPWARDS TWO HEADED ARROW
U+21A0↠append ↠ RIGHTWARDS TWO HEADED ARROW
U+21A1↡append ↡ DOWNWARDS TWO HEADED ARROW
U+21A2↢append ↢ LEFTWARDS ARROW WITH TAIL
U+21A3↣append ↣ RIGHTWARDS ARROW WITH TAIL
U+21A4↤append ↤ LEFTWARDS ARROW FROM BAR
U+21A5↥append ↥ UPWARDS ARROW FROM BAR
U+21A6↦append ↦ RIGHTWARDS ARROW FROM BAR
U+21A7↧append ↧ DOWNWARDS ARROW FROM BAR
U+21A8↨append ↨ UP DOWN ARROW WITH BASE
U+21A9↩append ↩ LEFTWARDS ARROW WITH HOOK
U+21AA↪append ↪ RIGHTWARDS ARROW WITH HOOK
U+21AB↫append ↫ LEFTWARDS ARROW WITH LOOP
U+21AC↬append ↬ RIGHTWARDS ARROW WITH LOOP
U+21AD↭append ↭ LEFT RIGHT WAVE ARROW
U+21AE↮append ↮ LEFT RIGHT ARROW WITH STROKE
U+21AF↯append ↯ DOWNWARDS ZIGZAG ARROW
U+21B0↰append ↰ UPWARDS ARROW WITH TIP LEFTWARDS
U+21B1↱append ↱ UPWARDS ARROW WITH TIP RIGHTWARDS
U+21B2↲append ↲ DOWNWARDS ARROW WITH TIP LEFTWARDS
U+21B3↳append ↳ DOWNWARDS ARROW WITH TIP RIGHTWARDS
U+21B4↴append ↴ RIGHTWARDS ARROW WITH CORNER DOWNWARDS
U+21B5↵append↵ ↵ DOWNWARDS ARROW WITH CORNER LEFTWARDS
U+21B6↶append ↶ ANTICLOCKWISE TOP SEMICIRCLE ARROW
U+21B7↷append ↷ CLOCKWISE TOP SEMICIRCLE ARROW
U+21B8↸append ↸ NORTH WEST ARROW TO LONG BAR
U+21B9↹append ↹ LEFTWARDS ARROW TO BAR OVER RIGHTWARDS ARROW TO BAR
U+21BA↺append ↺ ANTICLOCKWISE OPEN CIRCLE ARROW
U+21BB↻append ↻ CLOCKWISE OPEN CIRCLE ARROW
U+21BC↼append ↼ LEFTWARDS HARPOON WITH BARB UPWARDS
U+21BD↽append ↽ LEFTWARDS HARPOON WITH BARB DOWNWARDS
U+21BE↾append ↾ UPWARDS HARPOON WITH BARB RIGHTWARDS
U+21BF↿append ↿ UPWARDS HARPOON WITH BARB LEFTWARDS
U+21C0⇀append ⇀ RIGHTWARDS HARPOON WITH BARB UPWARDS
U+21C1⇁append ⇁ RIGHTWARDS HARPOON WITH BARB DOWNWARDS
U+21C2⇂append ⇂ DOWNWARDS HARPOON WITH BARB RIGHTWARDS
U+21C3⇃append ⇃ DOWNWARDS HARPOON WITH BARB LEFTWARDS
U+21C4⇄append ⇄ RIGHTWARDS ARROW OVER LEFTWARDS ARROW
U+21C5⇅append ⇅ UPWARDS ARROW LEFTWARDS OF DOWNWARDS ARROW
U+21C6⇆append ⇆ LEFTWARDS ARROW OVER RIGHTWARDS ARROW
U+21C7⇇append ⇇ LEFTWARDS PAIRED ARROWS
U+21C8⇈append ⇈ UPWARDS PAIRED ARROWS
U+21C9⇉append ⇉ RIGHTWARDS PAIRED ARROWS
U+21CA⇊append ⇊ DOWNWARDS PAIRED ARROWS
U+21CB⇋append ⇋ LEFTWARDS HARPOON OVER RIGHTWARDS HARPOON
U+21CC⇌append ⇌ RIGHTWARDS HARPOON OVER LEFTWARDS HARPOON
U+21CD⇍append ⇍ LEFTWARDS DOUBLE ARROW WITH STROKE
U+21CE⇎append ⇎ LEFT RIGHT DOUBLE ARROW WITH STROKE
U+21CF⇏append ⇏ RIGHTWARDS DOUBLE ARROW WITH STROKE
U+21D0⇐append⇐ ⇐ LEFTWARDS DOUBLE ARROW
U+21D1⇑append⇑ ⇑ UPWARDS DOUBLE ARROW
U+21D2⇒append⇒ ⇒ RIGHTWARDS DOUBLE ARROW
U+21D3⇓append⇓ ⇓ DOWNWARDS DOUBLE ARROW
U+21D4⇔append⇔ ⇔ LEFT RIGHT DOUBLE ARROW
U+21D5⇕append ⇕ UP DOWN DOUBLE ARROW
U+21D6⇖append ⇖ NORTH WEST DOUBLE ARROW
U+21D7⇗append ⇗ NORTH EAST DOUBLE ARROW
U+21D8⇘append ⇘ SOUTH EAST DOUBLE ARROW
U+21D9⇙append ⇙ SOUTH WEST DOUBLE ARROW
U+21DA⇚append ⇚ LEFTWARDS TRIPLE ARROW
U+21DB⇛append ⇛ RIGHTWARDS TRIPLE ARROW
U+21DC⇜append ⇜ LEFTWARDS SQUIGGLE ARROW
U+21DD⇝append ⇝ RIGHTWARDS SQUIGGLE ARROW
U+21DE⇞append ⇞ UPWARDS ARROW WITH DOUBLE STROKE
U+21DF⇟append ⇟ DOWNWARDS ARROW WITH DOUBLE STROKE
U+21E0⇠append ⇠ LEFTWARDS DASHED ARROW
U+21E1⇡append ⇡ UPWARDS DASHED ARROW
U+21E2⇢append ⇢ RIGHTWARDS DASHED ARROW
U+21E3⇣append ⇣ DOWNWARDS DASHED ARROW
U+21E4⇤append ⇤ LEFTWARDS ARROW TO BAR
U+21E5⇥append ⇥ RIGHTWARDS ARROW TO BAR
U+21E6⇦append ⇦ LEFTWARDS WHITE ARROW
U+21E7⇧append ⇧ UPWARDS WHITE ARROW
U+21E8⇨append ⇨ RIGHTWARDS WHITE ARROW
U+21E9⇩append ⇩ DOWNWARDS WHITE ARROW
U+21EA⇪append ⇪ UPWARDS WHITE ARROW FROM BAR
U+21EB⇫append ⇫ UPWARDS WHITE ARROW ON PEDESTAL
U+21EC⇬append ⇬ UPWARDS WHITE ARROW ON PEDESTAL WITH HORIZONTAL BAR
U+21ED⇭append ⇭ UPWARDS WHITE ARROW ON PEDESTAL WITH VERTICAL BAR
U+21EE⇮append ⇮ UPWARDS WHITE DOUBLE ARROW
U+21EF⇯append ⇯ UPWARDS WHITE DOUBLE ARROW ON PEDESTAL
U+21F0⇰append ⇰ RIGHTWARDS WHITE ARROW FROM WALL
U+21F1⇱append ⇱ NORTH WEST ARROW TO CORNER
U+21F2⇲append ⇲ SOUTH EAST ARROW TO CORNER
U+21F3⇳append ⇳ UP DOWN WHITE ARROW
U+21F4⇴append ⇴ RIGHT ARROW WITH SMALL CIRCLE
U+21F5⇵append ⇵ DOWNWARDS ARROW LEFTWARDS OF UPWARDS ARROW
U+21F6⇶append ⇶ THREE RIGHTWARDS ARROWS
U+21F7⇷append ⇷ LEFTWARDS ARROW WITH VERTICAL STROKE
U+21F8⇸append ⇸ RIGHTWARDS ARROW WITH VERTICAL STROKE
U+21F9⇹append ⇹ LEFT RIGHT ARROW WITH VERTICAL STROKE
U+21FA⇺append ⇺ LEFTWARDS ARROW WITH DOUBLE VERTICAL STROKE
U+21FB⇻append ⇻ RIGHTWARDS ARROW WITH DOUBLE VERTICAL STROKE
U+21FC⇼append ⇼ LEFT RIGHT ARROW WITH DOUBLE VERTICAL STROKE
U+21FD⇽append ⇽ LEFTWARDS OPEN-HEADED ARROW
U+21FE⇾append ⇾ RIGHTWARDS OPEN-HEADED ARROW
U+21FF⇿append ⇿ LEFT RIGHT OPEN-HEADED ARROW
U+2200∀append∀ ∀ FOR ALL
U+2201∁append ∁ COMPLEMENT
U+2202∂append∂ ∂ PARTIAL DIFFERENTIAL
U+2203∃append∃ ∃ THERE EXISTS
U+2204∄append ∄ THERE DOES NOT EXIST
U+2205∅append∅ ∅ EMPTY SET
U+2206∆append ∆ INCREMENT
U+2207∇append∇ ∇ NABLA
U+2208∈append∈ ∈ ELEMENT OF
U+2209∉append∉ ∉ NOT AN ELEMENT OF
U+220A∊append ∊ SMALL ELEMENT OF
U+220B∋append∋ ∋ CONTAINS AS MEMBER
U+220C∌append ∌ DOES NOT CONTAIN AS MEMBER
U+220D∍append ∍ SMALL CONTAINS AS MEMBER
U+220E∎append ∎ END OF PROOF
U+220F∏append∏ ∏ N-ARY PRODUCT
U+2210∐append ∐ N-ARY COPRODUCT
U+2211∑append∑ ∑ N-ARY SUMMATION
U+2212−append− − MINUS SIGN
U+2213∓append ∓ MINUS-OR-PLUS SIGN
U+2214∔append ∔ DOT PLUS
U+2215∕append ∕ DIVISION SLASH
U+2216∖append ∖ SET MINUS
U+2217∗append∗ ∗ ASTERISK OPERATOR
U+2218∘append ∘ RING OPERATOR
U+2219∙append ∙ BULLET OPERATOR
U+221A√append√ √ SQUARE ROOT
U+221B∛append ∛ CUBE ROOT
U+221C∜append ∜ FOURTH ROOT
U+221D∝append∝ ∝ PROPORTIONAL TO
U+221E∞append∞ ∞ INFINITY
U+221F∟append ∟ RIGHT ANGLE
U+2220∠append∠ ∠ ANGLE
U+2221∡append ∡ MEASURED ANGLE
U+2222∢append ∢ SPHERICAL ANGLE
U+2223∣append ∣ DIVIDES
U+2224∤append ∤ DOES NOT DIVIDE
U+2225∥append ∥ PARALLEL TO
U+2226∦append ∦ NOT PARALLEL TO
U+2227∧append∧ ∧ LOGICAL AND
U+2228∨append∨ ∨ LOGICAL OR
U+2229∩append∩ ∩ INTERSECTION
U+222A∪append∪ ∪ UNION
U+222B∫append∫ ∫ INTEGRAL
U+222C∬append ∬ DOUBLE INTEGRAL
U+222D∭append ∭ TRIPLE INTEGRAL
U+222E∮append ∮ CONTOUR INTEGRAL
U+222F∯append ∯ SURFACE INTEGRAL
U+2230∰append ∰ VOLUME INTEGRAL
U+2231∱append ∱ CLOCKWISE INTEGRAL
U+2232∲append ∲ CLOCKWISE CONTOUR INTEGRAL
U+2233∳append ∳ ANTICLOCKWISE CONTOUR INTEGRAL
U+2234∴append∴ ∴ THEREFORE
U+2235∵append ∵ BECAUSE
U+2236∶append ∶ RATIO
U+2237∷append ∷ PROPORTION
U+2238∸append ∸ DOT MINUS
U+2239∹append ∹ EXCESS
U+223A∺append ∺ GEOMETRIC PROPORTION
U+223B∻append ∻ HOMOTHETIC
U+223C∼append∼ ∼ TILDE OPERATOR
U+223D∽append ∽ REVERSED TILDE
U+223E∾append ∾ INVERTED LAZY S
U+223F∿append ∿ SINE WAVE
U+2240≀append ≀ WREATH PRODUCT
U+2241≁append ≁ NOT TILDE
U+2242≂append ≂ MINUS TILDE
U+2243≃append ≃ ASYMPTOTICALLY EQUAL TO
U+2244≄append ≄ NOT ASYMPTOTICALLY EQUAL TO
U+2245≅append≅ ≅ APPROXIMATELY EQUAL TO
U+2246≆append ≆ APPROXIMATELY BUT NOT ACTUALLY EQUAL TO
U+2247≇append ≇ NEITHER APPROXIMATELY NOR ACTUALLY EQUAL TO
U+2248≈append≈ ≈ ALMOST EQUAL TO
U+2249≉append ≉ NOT ALMOST EQUAL TO
U+224A≊append ≊ ALMOST EQUAL OR EQUAL TO
U+224B≋append ≋ TRIPLE TILDE
U+224C≌append ≌ ALL EQUAL TO
U+224D≍append ≍ EQUIVALENT TO
U+224E≎append ≎ GEOMETRICALLY EQUIVALENT TO
U+224F≏append ≏ DIFFERENCE BETWEEN
U+2250≐append ≐ APPROACHES THE LIMIT
U+2251≑append ≑ GEOMETRICALLY EQUAL TO
U+2252≒append ≒ APPROXIMATELY EQUAL TO OR THE IMAGE OF
U+2253≓append ≓ IMAGE OF OR APPROXIMATELY EQUAL TO
U+2254≔append ≔ COLON EQUALS
U+2255≕append ≕ EQUALS COLON
U+2256≖append ≖ RING IN EQUAL TO
U+2257≗append ≗ RING EQUAL TO
U+2258≘append ≘ CORRESPONDS TO
U+2259≙append ≙ ESTIMATES
U+225A≚append ≚ EQUIANGULAR TO
U+225B≛append ≛ STAR EQUALS
U+225C≜append ≜ DELTA EQUAL TO
U+225D≝append ≝ EQUAL TO BY DEFINITION
U+225E≞append ≞ MEASURED BY
U+225F≟append ≟ QUESTIONED EQUAL TO
U+2260≠append≠ ≠ NOT EQUAL TO
U+2261≡append≡ ≡ IDENTICAL TO
U+2262≢append ≢ NOT IDENTICAL TO
U+2263≣append ≣ STRICTLY EQUIVALENT TO
U+2264≤append≤ ≤ LESS-THAN OR EQUAL TO
U+2265≥append≥ ≥ GREATER-THAN OR EQUAL TO
U+2266≦append ≦ LESS-THAN OVER EQUAL TO
U+2267≧append ≧ GREATER-THAN OVER EQUAL TO
U+2268≨append ≨ LESS-THAN BUT NOT EQUAL TO
U+2269≩append ≩ GREATER-THAN BUT NOT EQUAL TO
U+226A≪append ≪ MUCH LESS-THAN
U+226B≫append ≫ MUCH GREATER-THAN
U+226C≬append ≬ BETWEEN
U+226D≭append ≭ NOT EQUIVALENT TO
U+226E≮append ≮ NOT LESS-THAN
U+226F≯append ≯ NOT GREATER-THAN
U+2270≰append ≰ NEITHER LESS-THAN NOR EQUAL TO
U+2271≱append ≱ NEITHER GREATER-THAN NOR EQUAL TO
U+2272≲append ≲ LESS-THAN OR EQUIVALENT TO
U+2273≳append ≳ GREATER-THAN OR EQUIVALENT TO
U+2274≴append ≴ NEITHER LESS-THAN NOR EQUIVALENT TO
U+2275≵append ≵ NEITHER GREATER-THAN NOR EQUIVALENT TO
U+2276≶append ≶ LESS-THAN OR GREATER-THAN
U+2277≷append ≷ GREATER-THAN OR LESS-THAN
U+2278≸append ≸ NEITHER LESS-THAN NOR GREATER-THAN
U+2279≹append ≹ NEITHER GREATER-THAN NOR LESS-THAN
U+227A≺append ≺ PRECEDES
U+227B≻append ≻ SUCCEEDS
U+227C≼append ≼ PRECEDES OR EQUAL TO
U+227D≽append ≽ SUCCEEDS OR EQUAL TO
U+227E≾append ≾ PRECEDES OR EQUIVALENT TO
U+227F≿append ≿ SUCCEEDS OR EQUIVALENT TO
U+2280⊀append ⊀ DOES NOT PRECEDE
U+2281⊁append ⊁ DOES NOT SUCCEED
U+2282⊂append⊂ ⊂ SUBSET OF
U+2283⊃append⊃ ⊃ SUPERSET OF
U+2284⊄append⊄ ⊄ NOT A SUBSET OF
U+2285⊅append ⊅ NOT A SUPERSET OF
U+2286⊆append⊆ ⊆ SUBSET OF OR EQUAL TO
U+2287⊇append⊇ ⊇ SUPERSET OF OR EQUAL TO
U+2288⊈append ⊈ NEITHER A SUBSET OF NOR EQUAL TO
U+2289⊉append ⊉ NEITHER A SUPERSET OF NOR EQUAL TO
U+228A⊊append ⊊ SUBSET OF WITH NOT EQUAL TO
U+228B⊋append ⊋ SUPERSET OF WITH NOT EQUAL TO
U+228C⊌append ⊌ MULTISET
U+228D⊍append ⊍ MULTISET MULTIPLICATION
U+228E⊎append ⊎ MULTISET UNION
U+228F⊏append ⊏ SQUARE IMAGE OF