Tutorial HTML5 nama entitas (surat - S) Terbaik Pada tahun 2024, Dalam tutorial ini Anda dapat mempelajari HTML5 nama entitas (surat - S)
Tidak semua entitas dalam tabel berikut dapat ditampilkan dengan benar di semua browser.
Saat ini, IE 11 adalah satu-satunya yang benar dapat menampilkan setiap HTML5 entitas browser.
karakter | nama entitas | kutukan |
---|---|---|
Ś | Sacute | 0015A |
¶ | sacute | 0015B |
. | sbquo | 0201A |
& Sc; | sc | 02ABC |
& Sc; | sc | 0227B |
& Scap; | scap | 02AB8 |
Š | Scaron | 00160 |
š | scaron | 00161 |
& Sccue; | sccue | 0227D |
& SCE; | SCE | 02AB4 |
& Sce; | SCE | 02AB0 |
Ş | Scedil | 0015E |
Ş | scedil | 0015F |
s | Scirc | 0015C |
s | scirc | 0015D |
& Scnap; | scnap | 02ABA |
& ScnE; | scnE | 02AB6 |
& Scnsim; | scnsim | 022E9 |
& Scpolint; | scpolint | 02A13 |
& Scsim; | scsim | 0227F |
& Scy; | Scy | 00.421 |
& Scy; | SCY | 00.441 |
⋅ | Sdot | 022C5 |
& Sdotb; | sdotb | 022A1 |
& Sdote; | sdote | 02A66 |
& Searhk; | searhk | 02.925 |
& SeArr; | seArr | 021D8 |
& Searr; | searr | 02.198 |
& Searrow; | searrow | 02.198 |
§ | sekte | 000A7 |
& Semi; | semifinal | 0003B |
& Seswar; | seswar | 02.929 |
& Setminus; | setminus | 02.216 |
& Setmn; | setmn | 02.216 |
& Doa Siang; | mengirim SMS berbau seks | 02.736 |
& Sfr; | Sfr | 1D516 |
& Sfr; | sfr | 1D530 |
& Sfrown; | sfrown | 02.322 |
& Tajam; | tajam | 0266F |
& SHCHcy; | SHCHcy | 00.429 |
& Shchcy; | shchcy | 00.449 |
& SHcy; | SHcy | 00.428 |
& Shcy; | shcy | 00.448 |
& ShortDownArrow; | ShortDownArrow | 02.193 |
& ShortLeftArrow; | ShortLeftArrow | 02.190 |
& Shortmid; | shortmid | 02.223 |
& Shortparallel; | shortparallel | 02.225 |
& ShortRightArrow; | ShortRightArrow | 02.192 |
& ShortUpArrow; | ShortUpArrow | 02.191 |
pemalu | 000AD | |
Σ | Sigma | 003A3 |
σ | sigma | 003C3 |
ς | sigmaf | 003C2 |
& Sigmav; | sigmav | 003C2 |
~ | sim | 0223C |
& Simdot; | simdot | 02A6A |
& Sime; | sime | 02.243 |
& Simeq; | simeq | 02.243 |
& SIMG; | SIMG | 02A9E |
& Simge; | Simge | 02AA0 |
& Siml; | siml | 02A9D |
& Simle; | simle | 02A9F |
& Simne; | simne | 02.246 |
& Simplus; | simplus | 02A24 |
& Simrarr; | simrarr | 02.972 |
& Slarr; | slarr | 02.190 |
& SmallCircle; | SmallCircle | 02.218 |
& Smallsetminus; | smallsetminus | 02.216 |
& Smashp; | smashp | 02A33 |
& Smeparsl; | smeparsl | 029E4 |
& Smid; | SMID | 02.223 |
& Smile; | senyum | 02.323 |
& Smt; | smt | 02AAA |
& SMTE; | SMTE | 02AAC |
& Smtes; | smtes | 02AAC + 0FE00 |
& SOFTcy; | SOFTcy | 0042C |
& Softcy; | softcy | 0044C |
& Sol; | sol | 0002F |
& Solb; | solb | 029C4 |
& Solbar; | Solbar | 0233F |
& Sopf; | Sopf | 1D54A |
& Sopf; | sopf | 1D564 |
♠ | sekop | 02.660 |
& Spadesuit; | spadesuit | 02.660 |
& Spar; | berdebat | 02.225 |
& Sqcap; | sqcap | 02.293 |
& Sqcaps; | sqcaps | 02.293 + 0FE00 |
& Sqcup; | sqcup | 02.294 |
& Sqcups; | sqcups | 02.294 + 0FE00 |
& Sqrt; | sqrt | 0221A |
& Sqsub; | sqsub | 0228F |
& Sqsube; | sqsube | 02.291 |
& Sqsubset; | sqsubset | 0228F |
& Sqsubseteq; | sqsubseteq | 02.291 |
& Sqsup; | sqsup | 02.290 |
& Sqsupe; | sqsupe | 02.292 |
& Sqsupset; | sqsupset | 02.290 |
& Sqsupseteq; | sqsupseteq | 02.292 |
& Squ; | squ | 025A1 |
& Lapangan; | persegi | 025A1 |
& Lapangan; | persegi | 025A1 |
& SquareIntersection; | SquareIntersection | 02.293 |
& SquareSubset; | SquareSubset | 0228F |
& SquareSubsetEqual; | SquareSubsetEqual | 02.291 |
& SquareSuperset; | SquareSuperset | 02.290 |
& SquareSupersetEqual; | SquareSupersetEqual | 02.292 |
& SquareUnion; | SquareUnion | 02.294 |
& Squarf; | squarf | 025AA |
& Squf; | squf | 025AA |
& Srarr; | srarr | 02.192 |
& Sscr; | Sscr | 1D4AE |
& Sscr; | sscr | 1D4C8 |
& Ssetmn; | ssetmn | 02.216 |
& Ssmile; | ssmile | 02.323 |
& Sstarf; | sstarf | 022C6 |
& Star; | bintang | 022C6 |
& Star; | bintang | 02.606 |
& Starf; | starf | 02.605 |
& Straightepsilon; | straightepsilon | 003F5 |
& Straightphi; | straightphi | 003D5 |
& Strns; | strns | 000AF |
& Sub; | sub | 022D0 |
⊂ | sub | 02.282 |
& Subdot; | subdot | 02ABD |
& Sube; | Sube | 02AC5 |
⊆ | Sube | 02.286 |
& Subedot; | subedot | 02AC3 |
& Submult; | submult | 02AC1 |
& SubnE; | subnE | 02ACB |
& Subne; | subne | 0228A |
& Subplus; | subplus | 02ABF |
& Subrarr; | subrarr | 02.979 |
& Subset; | Subset | 022D0 |
& Subset; | bagian | 02.282 |
& Subseteq; | subseteq | 02.286 |
& Subseteqq; | subseteqq | 02AC5 |
& SubsetEqual; | SubsetEqual | 02.286 |
& Subsetneq; | subsetneq | 0228A |
& Subsetneqq; | subsetneqq | 02ACB |
& Subsim; | subsim | 02AC7 |
& Subsub; | subsub | 02AD5 |
& Subsup; | subsup | 02AD3 |
& Succ; | succ | 0227B |
& Succapprox; | succapprox | 02AB8 |
& Succcurlyeq; | succcurlyeq | 0227D |
& Berhasil; | berhasil | 0227B |
& SucceedsEqual; | SucceedsEqual | 02AB0 |
& SucceedsSlantEqual; | SucceedsSlantEqual | 0227D |
& SucceedsTilde; | SucceedsTilde | 0227F |
& Succeq; | succeq | 02AB0 |
& Succnapprox; | succnapprox | 02ABA |
& Succneqq; | succneqq | 02AB6 |
& Succnsim; | succnsim | 022E9 |
& Succsim; | succsim | 0227F |
& SuchThat; | SuchThat | 0220B |
& Sum; | jumlah | 02.211 |
Σ | jumlah | 02.211 |
& Sung; | sung | 0266A |
& Sup; | Sup | 022D1 |
⊃ | sup | 02.283 |
¹ | SUP1 | 000B9 |
² | sup2 | 000B2 |
³ | sup3 | 000B3 |
& Supdot; | supdot | 02ABE |
& Supdsub; | supdsub | 02AD8 |
& Supe; | Supe | 02AC6 |
⊇ | supe | 02.287 |
& Supedot; | supedot | 02AC4 |
& Superset; | superset | 02.283 |
& SupersetEqual; | SupersetEqual | 02.287 |
& Suphsol; | suphsol | 027C9 |
& Suphsub; | suphsub | 02AD7 |
& Suplarr; | suplarr | 0297B |
& Supmult; | supmult | 02AC2 |
& SupnE; | supnE | 02ACC |
& Supne; | supne | 0228B |
& Supplus; | supplus | 02AC0 |
& Supset; | Supset | 022D1 |
& Supset; | supset | 02.283 |
& Supseteq; | supseteq | 02.287 |
& Supseteqq; | supseteqq | 02AC6 |
& Supsetneq; | supsetneq | 0228B |
& Supsetneqq; | supsetneqq | 02ACC |
& Supsim; | supsim | 02AC8 |
& Supsub; | supsub | 02AD4 |
& Supsup; | Supsup | 02AD6 |
& Swarhk; | swarhk | 02.926 |
& SwArr; | swArr | 021D9 |
& Swarr; | swarr | 02199 |
& Swarrow; | swarrow | 02199 |
& Swnwar; | swnwar | 0292A |
ß | szlig | 000DF |