HTML5- entiteitsname volgens alfabet - S
Ouer blaaiers ondersteun dalk nie al die HTML5-entiteite in die tabel hieronder nie.
Chrome en Opera het goeie ondersteuning, en IE 11+ en Firefox 35+ ondersteun al die entiteite.
Karakter | Entiteit Naam | Heks | Des |
---|---|---|---|
Ś | skud | 0015A | 346 |
ś | skud | 0015B | 347 |
‚ | sbquo | 0201A | 8218 |
⪼ | Sc | 02ABC | 10940 |
≻ | sc | 0227B | 8827 |
⪸ | skud | 02AB8 | 10936 |
Š | Scaron | 00160 | 352 |
š | scaron | 00161 | 353 |
≽ | spoor | 0227D | 8829 |
⪴ | scE | 02AB4 | 10932 |
⪰ | sce | 02AB0 | 10928 |
Ş | Scedil | 0015E | 350 |
ş | scedil | 0015F | 351 |
Ŝ | Scirc | 0015C | 348 |
ˆ | scirc | 0015D | 349 |
&snap; | knip | 02ABA | 10938 |
⪶ | scnE | 02AB6 | 10934 |
⋩ | scnsim | 022E9 | 8937 |
⨓ | scpolint | 02A13 | 10771 |
≿ | scsim | 0227F | 8831 |
С | Scy | 00421 | 1057 |
с | skelm | 00441 | 1089 |
⋅ | sdot | 022C5 | 8901 |
⊡ | sdotb | 022A1 | 8865 |
⩦ | sdote | 02A66 | 10854 |
&soek; | soekhk | 02925 | 10533 |
⇘ | seArr | 021D8 | 8664 |
↘ | searr | 02198 | 8600 |
↘ | soek | 02198 | 8600 |
§ | sekte | 000A7 | 167 |
; | semi | 0003B | 59 |
⤩ | seswar | 02929 | 10537 |
∖ | amper | 02216 | 8726 |
∖ | stel | 02216 | 8726 |
&seks; | sekst | 02736 | 10038 |
𝔖 | Sfr | 1D516 | 120086 |
𝔰 | sfr | 1D530 | 120112 |
&frons; | verswyg | 02322 | 8994 |
&skerp; | skerp | 0266F | 9839 |
Щ | SHCHcy | 00429 | 1065 |
щ | sjoe | 00449 | 1097 |
Ш | SHcy | 00428 | 1064 |
ш | skaam | 00448 | 1096 |
↓ | ShortDownArrow | 02193 | 8595 |
← | ShortLeftArrow | 02190 | 8592 |
∣ | kortmiddel | 02223 | 8739 |
&kortparallel; | kort parallel | 02225 | 8741 |
→ | Kort Regspyl | 02192 | 8594 |
↑ | ShortUpArrow | 02191 | 8593 |
| skaam | 000 nC | 173 |
Σ | Sigma | 003A3 | 931 |
σ | sigma | 003C3 | 963 |
ς | sigmaf | 003C2 | 962 |
ς | sigmav | 003C2 | 962 |
∼ | sim | 0223C | 8764 |
⩪ | simdot | 02A6A | 10858 |
&gelyk; | sime | 02243 | 8771 |
≃ | simek | 02243 | 8771 |
⪞ | simg | 02A9E | 10910 |
⪠ | simbool | 02AA0 | 10912 |
⪝ | siml | 02A9D | 10909 |
⪟ | eenvoudig | 02A9F | 10911 |
≆ | skoorsteen | 02246 | 8774 |
⨤ | eenvoudig | 02A24 | 10788 |
⥲ | simrarr | 02972 | 10610 |
← | slarr | 02190 | 8592 |
&Kleinkring; | Kleinsirkel | 02218 | 8728 |
∖ | kleinsetminus | 02216 | 8726 |
⨳ | smashp | 02A33 | 10803 |
⧤ | smeparsl | 029E4 | 10724 |
∣ | smid | 02223 | 8739 |
&glimlag; | glimlag | 02323 | 8995 |
⪪ | smt | 02AAA | 10922 |
⪬ | smte | 02AAC | 10924 |
⪬︀ | smtes | 02AAC + 0FE00 | 10924 |
Ь | SOFTcy | 0042C | 1068 |
ь | sagtheid | 0044C | 1100 |
/ | sol | 0002F | 47 |
⧄ | oplos | 029C4 | 10692 |
⌿ | solbar | 0233F | 9023 |
𝕊 | pot | 1D54A | 120138 |
𝕤 | sop | 1D564 | 120164 |
♠ | grawe | 02660 | 9824 |
♠ | spadepak | 02660 | 9824 |
∥ | spartel | 02225 | 8741 |
⊓ | vierkante kap | 02293 | 8851 |
⊓︀ | sqcaps | 02293 + 0FE00 | 8851 |
⊔ | vierkante kop | 02294 | 8852 |
⊔︀ | vierkante koppies | 02294 + 0FE00 | 8852 |
√ | Sqrt | 0221A | 8730 |
⊏ | sqsub | 0228F | 8847 |
⊑ | sqsube | 02291 | 8849 |
⊏ | sqsubset | 0228F | 8847 |
⊑ | sqsubseteq | 02291 | 8849 |
⊐ | sqsup | 02290 | 8848 |
⊒ | sqsupe | 02292 | 8850 |
⊐ | sqontsteld | 02290 | 8848 |
⊒ | sqsupseteq | 02292 | 8850 |
□ | vk | 025A1 | 9633 |
&Vierkant; | Vierkantig | 025A1 | 9633 |
&vierkant; | vierkantig | 025A1 | 9633 |
⊓ | Vierkantige kruising | 02293 | 8851 |
⊏ | SquareSubset | 0228F | 8847 |
⊑ | SquareSubsetEqual | 02291 | 8849 |
⊐ | SquareSuperset | 02290 | 8848 |
⊒ | SquareSupersetEqual | 02292 | 8850 |
⊔ | SquareUnion | 02294 | 8852 |
▪ | squarf | 025AA | 9642 |
▪ | squf | 025AA | 9642 |
→ | srarr | 02192 | 8594 |
&Skr; | Sskr | 1D4AE | 119982 |
&scr; | sskr | 1D4C8 | 120008 |
∖ | ssetmn | 02216 | 8726 |
⌣ | sglimlag | 02323 | 8995 |
⋆ | sstarf | 022C6 | 8902 |
&Ster; | Ster | 022C6 | 8902 |
&ster; | ster | 02606 | 9734 |
★ | werk | 02605 | 9733 |
ϵ | reguit psilon | 003F5 | 1013 |
ϕ | reguit | 003D5 | 981 |
¯ | strns | 000AF | 175 |
⋐ | Sub | 022D0 | 8912 |
⊂ | sub | 02282 | 8834 |
⪽ | subpunt | 02ABD | 10941 |
⫅ | gaan op | 02AC5 | 10949 |
⊆ | gaan op | 02286 | 8838 |
⫃ | subedot | 02AC3 | 10947 |
⫁ | submult | 02AC1 | 10945 |
⫋ | subnE | 02ACB | 10955 |
⊊ | subne | 0228A | 8842 |
⪿ | subplus | 02ABF | 10943 |
⥹ | subrarr | 02979 | 10617 |
&Onderafdeling; | Onderafdeling | 022D0 | 8912 |
&onderafdeling; | onderafdeling | 02282 | 8834 |
⊆ | subseteq | 02286 | 8838 |
⫅ | subseteqq | 02AC5 | 10949 |
⊆ | SubsetGelyk | 02286 | 8838 |
⊊ | subsetneq | 0228A | 8842 |
⫋ | subsetneqq | 02ACB | 10955 |
⫇ | subsim | 02AC7 | 10951 |
& subsub; | intens | 02AD5 | 10965 |
⫓ | subsup | 02AD3 | 10963 |
≻ | succ | 0227B | 8827 |
⪸ | ongeveer | 02AB8 | 10936 |
≽ | succcurlyeq | 0227D | 8829 |
&Suksesvol; | Slaag | 0227B | 8827 |
&SuksesGelyk; | SuksesGelyk | 02AB0 | 10928 |
&SuksesSlantGelyk; | SuksesSlankGelyk | 0227D | 8829 |
&SuksesTilde; | Suksesvol Tilde | 0227F | 8831 |
⪰ | slaag | 02AB0 | 10928 |
&sucnapprox; | amper | 02ABA | 10938 |
&sccneqq; | succneqq | 02AB6 | 10934 |
&sucnsim; | succnsim | 022E9 | 8937 |
&sucsim; | succsim | 0227F | 8831 |
&Sodat; | Sodat | 0220B | 8715 |
&Som; | Som | 02211 | 8721 |
∑ | som | 02211 | 8721 |
&gesing; | gesing | 0266A | 9834 |
⋑ | Sup | 022D1 | 8913 |
⊃ | sup | 02283 | 8835 |
¹ | sup1 | 000B9 | 185 |
² | sup2 | 000B2 | 178 |
³ | sup3 | 000B3 | 179 |
⪾ | supdot | 02ABE | 10942 |
⫘ | supdsub | 02AD8 | 10968 |
⫆ | super | 02AC6 | 10950 |
⊇ | ek het geweet | 02287 | 8839 |
⫄ | supedot | 02AC4 | 10948 |
⊃ | Superset | 02283 | 8835 |
⊇ | SupersetEqual | 02287 | 8839 |
⟉ | suphsol | 027C9 | 10185 |
⫗ | suphsub | 02AD7 | 10967 |
⥻ | suplarr | 0297B | 10619 |
⫂ | opstaan | 02AC2 | 10946 |
⫌ | supnE | 02ACC | 10956 |
⊋ | supne | 0228B | 8843 |
⫀ | oorskot | 02AC0 | 10944 |
&Ontstel; | Ontsteld | 022D1 | 8913 |
&upset; | versteur | 02283 | 8835 |
⊇ | supseteq | 02287 | 8839 |
⫆ | supseteqq | 02AC6 | 10950 |
⊋ | supsetneq | 0228B | 8843 |
⫌ | supsetneqq | 02ACC | 10956 |
⫈ | veronderstel | 02AC8 | 10952 |
⫔ | supsub | 02AD4 | 10964 |
& supsup; | supsup | 02AD6 | 10966 |
⤦ | swarhk | 02926 | 10534 |
⇙ | swArr | 021D9 | 8665 |
↙ | swarr | 02199 | 8601 |
↙ | swaertjie | 02199 | 8601 |
⤪ | fluisterend | 0292A | 10538 |
ß | szlig | 000DF | 223 |