diff options
Diffstat (limited to 'source/pl/helpcontent2/source/text/smath/01.po')
| -rw-r--r-- | source/pl/helpcontent2/source/text/smath/01.po | 508 |
1 files changed, 150 insertions, 358 deletions
diff --git a/source/pl/helpcontent2/source/text/smath/01.po b/source/pl/helpcontent2/source/text/smath/01.po index 3d7b7ee8b5f..2906e79badf 100644 --- a/source/pl/helpcontent2/source/text/smath/01.po +++ b/source/pl/helpcontent2/source/text/smath/01.po @@ -3,9 +3,9 @@ msgid "" msgstr "" "Project-Id-Version: PACKAGE VERSION\n" "Report-Msgid-Bugs-To: https://bugs.libreoffice.org/enter_bug.cgi?product=LibreOffice&bug_status=UNCONFIRMED&component=UI\n" -"POT-Creation-Date: 2018-11-12 12:23+0100\n" -"PO-Revision-Date: 2018-10-29 20:56+0000\n" -"Last-Translator: Piotr <piotrekr1@gmail.com>\n" +"POT-Creation-Date: 2019-01-12 13:18+0100\n" +"PO-Revision-Date: 2018-11-12 14:00+0000\n" +"Last-Translator: Anonymous Pootle User\n" "Language-Team: LANGUAGE <LL@li.org>\n" "Language: pl\n" "MIME-Version: 1.0\n" @@ -14,7 +14,7 @@ msgstr "" "Plural-Forms: nplurals=3; plural=(n==1 ? 0 : n%10>=2 && n%10<=4 && (n%100<10 || n%100>=20) ? 1 : 2);\n" "X-Accelerator-Marker: ~\n" "X-Generator: LibreOffice\n" -"X-POOTLE-MTIME: 1540846616.000000\n" +"X-POOTLE-MTIME: 1542031213.000000\n" #: 02080000.xhp msgctxt "" @@ -437,8 +437,8 @@ msgctxt "" "03090100.xhp\n" "par_idN10085\n" "help.text" -msgid "<image id=\"img_id3156399\" src=\"media/helpimg/starmath/un21201.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3156399\">Icon</alt></image>" -msgstr "<image id=\"img_id3156399\" src=\"media/helpimg/starmath/un21201.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3156399\">Ikona</alt></image>" +msgid "<image id=\"img_id3156399\" src=\"media/helpimg/starmath/un21201.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3156399\">Plus Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -461,8 +461,8 @@ msgctxt "" "03090100.xhp\n" "par_idN100C1\n" "help.text" -msgid "<image id=\"img_id3148776\" src=\"media/helpimg/starmath/un21202.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148776\">Icon</alt></image>" -msgstr "<image id=\"img_id3148776\" src=\"media/helpimg/starmath/un21202.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148776\">Ikona</alt></image>" +msgid "<image id=\"img_id3148776\" src=\"media/helpimg/starmath/un21202.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148776\">Minus Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -485,8 +485,8 @@ msgctxt "" "03090100.xhp\n" "par_idN100FD\n" "help.text" -msgid "<image id=\"img_id3150757\" src=\"media/helpimg/starmath/un21203.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150757\">Icon</alt></image>" -msgstr "<image id=\"img_id3150757\" src=\"media/helpimg/starmath/un21203.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150757\">Ikona</alt></image>" +msgid "<image id=\"img_id3150757\" src=\"media/helpimg/starmath/un21203.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150757\">Plus/Minus Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -509,8 +509,8 @@ msgctxt "" "03090100.xhp\n" "par_idN10139\n" "help.text" -msgid "<image id=\"img_id3145410\" src=\"media/helpimg/starmath/un21204.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145410\">Icon</alt></image>" -msgstr "<image id=\"img_id3145410\" src=\"media/helpimg/starmath/un21204.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145410\">Ikona</alt></image>" +msgid "<image id=\"img_id3145410\" src=\"media/helpimg/starmath/un21204.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145410\">Minus/Plus Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -533,8 +533,8 @@ msgctxt "" "03090100.xhp\n" "par_idN10175\n" "help.text" -msgid "<image id=\"img_id3151098\" src=\"media/helpimg/starmath/un21205.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151098\">Icon</alt></image>" -msgstr "<image id=\"img_id3151098\" src=\"media/helpimg/starmath/un21205.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151098\">Ikona</alt></image>" +msgid "<image id=\"img_id3151098\" src=\"media/helpimg/starmath/un21205.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151098\">Addition (plus) Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -557,8 +557,8 @@ msgctxt "" "03090100.xhp\n" "par_idN101B0\n" "help.text" -msgid "<image id=\"img_id3155898\" src=\"media/helpimg/starmath/un21206.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155898\">Icon</alt></image>" -msgstr "<image id=\"img_id3155898\" src=\"media/helpimg/starmath/un21206.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155898\">Ikona</alt></image>" +msgid "<image id=\"img_id3155898\" src=\"media/helpimg/starmath/un21206.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155898\">Multiplication (dot) Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -581,8 +581,8 @@ msgctxt "" "03090100.xhp\n" "par_idN101E9\n" "help.text" -msgid "<image id=\"img_id3149308\" src=\"media/helpimg/starmath/un21207.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149308\">Icon</alt></image>" -msgstr "<image id=\"img_id3149308\" src=\"media/helpimg/starmath/un21207.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149308\">Ikona</alt></image>" +msgid "<image id=\"img_id3149308\" src=\"media/helpimg/starmath/un21207.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149308\">Multiplication (x) Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -605,8 +605,8 @@ msgctxt "" "03090100.xhp\n" "par_idN10226\n" "help.text" -msgid "<image id=\"img_id3148982\" src=\"media/helpimg/starmath/un21208.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148982\">Icon</alt></image>" -msgstr "<image id=\"img_id3148982\" src=\"media/helpimg/starmath/un21208.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148982\">Ikona</alt></image>" +msgid "<image id=\"img_id3148982\" src=\"media/helpimg/starmath/un21208.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148982\">Multiplication (*) Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -629,8 +629,8 @@ msgctxt "" "03090100.xhp\n" "par_idN1025F\n" "help.text" -msgid "<image id=\"img_id3155140\" src=\"media/helpimg/starmath/un21209.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155140\">Icon</alt></image>" -msgstr "<image id=\"img_id3155140\" src=\"media/helpimg/starmath/un21209.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155140\">Ikona</alt></image>" +msgid "<image id=\"img_id3155140\" src=\"media/helpimg/starmath/un21209.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155140\">Subtraction Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -653,8 +653,8 @@ msgctxt "" "03090100.xhp\n" "par_idN10298\n" "help.text" -msgid "<image id=\"img_id3149168\" src=\"media/helpimg/starmath/un21210.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149168\">Icon</alt></image>" -msgstr "<image id=\"img_id3149168\" src=\"media/helpimg/starmath/un21210.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149168\">Ikona</alt></image>" +msgid "<image id=\"img_id3149168\" src=\"media/helpimg/starmath/un21210.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149168\">Division (Fraction) Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -677,8 +677,8 @@ msgctxt "" "03090100.xhp\n" "par_idN102D1\n" "help.text" -msgid "<image id=\"img_id3148765\" src=\"media/helpimg/starmath/un21211.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148765\">Icon</alt></image>" -msgstr "<image id=\"img_id3148765\" src=\"media/helpimg/starmath/un21211.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148765\">Ikona</alt></image>" +msgid "<image id=\"img_id3148765\" src=\"media/helpimg/starmath/un21211.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148765\">Division Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -701,8 +701,8 @@ msgctxt "" "03090100.xhp\n" "par_idN1030A\n" "help.text" -msgid "<image id=\"img_id3147418\" src=\"media/helpimg/starmath/un21212.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147418\">Icon</alt></image>" -msgstr "<image id=\"img_id3147418\" src=\"media/helpimg/starmath/un21212.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147418\">Ikona</alt></image>" +msgid "<image id=\"img_id3147418\" src=\"media/helpimg/starmath/un21212.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147418\">Division (Slash) Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -725,8 +725,8 @@ msgctxt "" "03090100.xhp\n" "par_idN10343\n" "help.text" -msgid "<image id=\"img_id3149566\" src=\"media/helpimg/starmath/un21213.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3149566\">Icon</alt></image>" -msgstr "<image id=\"img_id3149566\" src=\"media/helpimg/starmath/un21213.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3149566\">Ikona</alt></image>" +msgid "<image id=\"img_id3149566\" src=\"media/helpimg/starmath/un21213.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3149566\">Boolean NOT Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -749,8 +749,8 @@ msgctxt "" "03090100.xhp\n" "par_idN10383\n" "help.text" -msgid "<image id=\"img_id3147116\" src=\"media/helpimg/starmath/un21214.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147116\">Icon</alt></image>" -msgstr "<image id=\"img_id3147116\" src=\"media/helpimg/starmath/un21214.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147116\">Ikona</alt></image>" +msgid "<image id=\"img_id3147116\" src=\"media/helpimg/starmath/un21214.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147116\">Boolean AND Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -773,8 +773,8 @@ msgctxt "" "03090100.xhp\n" "par_idN103C3\n" "help.text" -msgid "<image id=\"img_id3148440\" src=\"media/helpimg/starmath/un21215.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148440\">Icon</alt></image>" -msgstr "<image id=\"img_id3148440\" src=\"media/helpimg/starmath/un21215.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148440\">Ikona</alt></image>" +msgid "<image id=\"img_id3148440\" src=\"media/helpimg/starmath/un21215.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148440\">Boolean OR Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -797,8 +797,8 @@ msgctxt "" "03090100.xhp\n" "par_idN10403\n" "help.text" -msgid "<image id=\"img_id3150173\" src=\"media/helpimg/starmath/un21221.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150173\">Icon</alt></image>" -msgstr "<image id=\"img_id3150173\" src=\"media/helpimg/starmath/un21221.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150173\">Ikona</alt></image>" +msgid "<image id=\"img_id3150173\" src=\"media/helpimg/starmath/un21221.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150173\">Concatenate Icon</alt></image>" +msgstr "" #: 03090100.xhp msgctxt "" @@ -1749,8 +1749,8 @@ msgctxt "" "03090300.xhp\n" "par_idN10088\n" "help.text" -msgid "<image id=\"img_id3152944\" src=\"media/helpimg/starmath/fo21601.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3152944\">Icon</alt></image>" -msgstr "<image id=\"img_id3152944\" src=\"media/helpimg/starmath/fo21601.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3152944\">Ikona</alt></image>" +msgid "<image id=\"img_id3152944\" src=\"media/helpimg/starmath/fo21601.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3152944\">Limit Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1773,8 +1773,8 @@ msgctxt "" "03090300.xhp\n" "par_idN100C4\n" "help.text" -msgid "<image id=\"img_id3150970\" src=\"media/helpimg/starmath/fo21602.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150970\">Icon</alt></image>" -msgstr "<image id=\"img_id3150970\" src=\"media/helpimg/starmath/fo21602.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150970\">Ikona</alt></image>" +msgid "<image id=\"img_id3150970\" src=\"media/helpimg/starmath/fo21602.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150970\">Summation Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1797,8 +1797,8 @@ msgctxt "" "03090300.xhp\n" "par_idN10102\n" "help.text" -msgid "<image id=\"img_id3146932\" src=\"media/helpimg/starmath/fo21603.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3146932\">Icon</alt></image>" -msgstr "<image id=\"img_id3146932\" src=\"media/helpimg/starmath/fo21603.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3146932\">Ikona</alt></image>" +msgid "<image id=\"img_id3146932\" src=\"media/helpimg/starmath/fo21603.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3146932\">Product Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1821,8 +1821,8 @@ msgctxt "" "03090300.xhp\n" "par_idN1013E\n" "help.text" -msgid "<image id=\"img_id3149814\" src=\"media/helpimg/starmath/fo21604.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3149814\">Icon</alt></image>" -msgstr "<image id=\"img_id3149814\" src=\"media/helpimg/starmath/fo21604.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3149814\">Ikona</alt></image>" +msgid "<image id=\"img_id3149814\" src=\"media/helpimg/starmath/fo21604.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3149814\">Coproduct Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1845,8 +1845,8 @@ msgctxt "" "03090300.xhp\n" "par_idN1017A\n" "help.text" -msgid "<image id=\"img_id3152766\" src=\"media/helpimg/starmath/fo21613.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3152766\">Icon</alt></image>" -msgstr "<image id=\"img_id3152766\" src=\"media/helpimg/starmath/fo21613.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3152766\">Ikona</alt></image>" +msgid "<image id=\"img_id3152766\" src=\"media/helpimg/starmath/fo21613.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3152766\">Upper and Lower Limit Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1869,8 +1869,8 @@ msgctxt "" "03090300.xhp\n" "par_idN101B8\n" "help.text" -msgid "<image id=\"img_id3151023\" src=\"media/helpimg/starmath/fo21605.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3151023\">Icon</alt></image>" -msgstr "<image id=\"img_id3151023\" src=\"media/helpimg/starmath/fo21605.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3151023\">Ikona</alt></image>" +msgid "<image id=\"img_id3151023\" src=\"media/helpimg/starmath/fo21605.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3151023\">Integral Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1893,8 +1893,8 @@ msgctxt "" "03090300.xhp\n" "par_idN101F4\n" "help.text" -msgid "<image id=\"img_id3145772\" src=\"media/helpimg/starmath/fo21606.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3145772\">Icon</alt></image>" -msgstr "<image id=\"img_id3145772\" src=\"media/helpimg/starmath/fo21606.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3145772\">Ikona</alt></image>" +msgid "<image id=\"img_id3145772\" src=\"media/helpimg/starmath/fo21606.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3145772\">Double Integral Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1917,8 +1917,8 @@ msgctxt "" "03090300.xhp\n" "par_idN10230\n" "help.text" -msgid "<image id=\"img_id3147409\" src=\"media/helpimg/starmath/fo21607.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147409\">Icon</alt></image>" -msgstr "<image id=\"img_id3147409\" src=\"media/helpimg/starmath/fo21607.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147409\">Ikona</alt></image>" +msgid "<image id=\"img_id3147409\" src=\"media/helpimg/starmath/fo21607.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147409\">Triple Integral Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1941,8 +1941,8 @@ msgctxt "" "03090300.xhp\n" "par_idN1026C\n" "help.text" -msgid "<image id=\"img_id3149562\" src=\"media/helpimg/starmath/fo21614.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149562\">Icon</alt></image>" -msgstr "<image id=\"img_id3149562\" src=\"media/helpimg/starmath/fo21614.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149562\">Ikona</alt></image>" +msgid "<image id=\"img_id3149562\" src=\"media/helpimg/starmath/fo21614.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149562\">Lower Limit Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1965,8 +1965,8 @@ msgctxt "" "03090300.xhp\n" "par_idN102AA\n" "help.text" -msgid "<image id=\"img_id3147109\" src=\"media/helpimg/starmath/fo21609.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147109\">Icon</alt></image>" -msgstr "<image id=\"img_id3147109\" src=\"media/helpimg/starmath/fo21609.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147109\">Ikona</alt></image>" +msgid "<image id=\"img_id3147109\" src=\"media/helpimg/starmath/fo21609.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147109\">Curve Integral Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -1989,8 +1989,8 @@ msgctxt "" "03090300.xhp\n" "par_idN102E6\n" "help.text" -msgid "<image id=\"img_id3147055\" src=\"media/helpimg/starmath/fo21610.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147055\">Icon</alt></image>" -msgstr "<image id=\"img_id3147055\" src=\"media/helpimg/starmath/fo21610.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147055\">Ikona</alt></image>" +msgid "<image id=\"img_id3147055\" src=\"media/helpimg/starmath/fo21610.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3147055\">Double Curve Integral Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -2013,8 +2013,8 @@ msgctxt "" "03090300.xhp\n" "par_idN10322\n" "help.text" -msgid "<image id=\"img_id3154578\" src=\"media/helpimg/starmath/fo21611.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3154578\">Icon</alt></image>" -msgstr "<image id=\"img_id3154578\" src=\"media/helpimg/starmath/fo21611.png\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3154578\">Ikona</alt></image>" +msgid "<image id=\"img_id3154578\" src=\"media/helpimg/starmath/fo21611.svg\" width=\"0.25inch\" height=\"0.25inch\"><alt id=\"alt_id3154578\">Triple Curve Integral Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -2037,8 +2037,8 @@ msgctxt "" "03090300.xhp\n" "par_idN1035E\n" "help.text" -msgid "<image id=\"img_id3149332\" src=\"media/helpimg/starmath/fo21615.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149332\">Icon</alt></image>" -msgstr "<image id=\"img_id3149332\" src=\"media/helpimg/starmath/fo21615.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149332\">Ikona</alt></image>" +msgid "<image id=\"img_id3149332\" src=\"media/helpimg/starmath/fo21615.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149332\">Upper Limit Icon</alt></image>" +msgstr "" #: 03090300.xhp msgctxt "" @@ -2157,8 +2157,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10081\n" "help.text" -msgid "<image id=\"img_id3153154\" src=\"media/helpimg/starmath/fu21505.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3153154\">Icon</alt></image>" -msgstr "<image id=\"img_id3153154\" src=\"media/helpimg/starmath/fu21505.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3153154\">Ikona</alt></image>" +msgid "<image id=\"img_id3153154\" src=\"media/helpimg/starmath/fu21505.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3153154\">Natural Exponential Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2181,8 +2181,8 @@ msgctxt "" "03090400.xhp\n" "par_idN100BC\n" "help.text" -msgid "<image id=\"img_id3147507\" src=\"media/helpimg/starmath/fu21506.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147507\">Icon</alt></image>" -msgstr "<image id=\"img_id3147507\" src=\"media/helpimg/starmath/fu21506.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147507\">Ikona</alt></image>" +msgid "<image id=\"img_id3147507\" src=\"media/helpimg/starmath/fu21506.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147507\">Natural Logarithm Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2205,8 +2205,8 @@ msgctxt "" "03090400.xhp\n" "par_idN100F7\n" "help.text" -msgid "<image id=\"img_id3154574\" src=\"media/helpimg/starmath/fu21507.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154574\">Icon</alt></image>" -msgstr "<image id=\"img_id3154574\" src=\"media/helpimg/starmath/fu21507.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154574\">Ikona</alt></image>" +msgid "<image id=\"img_id3154574\" src=\"media/helpimg/starmath/fu21507.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154574\">Exponential Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2229,8 +2229,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10132\n" "help.text" -msgid "<image id=\"img_id3149687\" src=\"media/helpimg/starmath/fu21508.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149687\">Icon</alt></image>" -msgstr "<image id=\"img_id3149687\" src=\"media/helpimg/starmath/fu21508.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149687\">Ikona</alt></image>" +msgid "<image id=\"img_id3149687\" src=\"media/helpimg/starmath/fu21508.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149687\">Logarithm Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2253,8 +2253,8 @@ msgctxt "" "03090400.xhp\n" "par_id3149483\n" "help.text" -msgid "<image id=\"img_id3149490\" src=\"media/helpimg/starmath/fu21908.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149490\">Icon</alt></image>" -msgstr "<image id=\"img_id3149490\" src=\"media/helpimg/starmath/fu21908.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149490\">Ikona</alt></image>" +msgid "<image id=\"img_id3149490\" src=\"media/helpimg/starmath/fu21908.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149490\">Power Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2277,8 +2277,8 @@ msgctxt "" "03090400.xhp\n" "par_idN101B1\n" "help.text" -msgid "<image id=\"img_id3149043\" src=\"media/helpimg/starmath/fu21509.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149043\">Icon</alt></image>" -msgstr "<image id=\"img_id3149043\" src=\"media/helpimg/starmath/fu21509.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149043\">Ikona</alt></image>" +msgid "<image id=\"img_id3149043\" src=\"media/helpimg/starmath/fu21509.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149043\">Sine Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2301,8 +2301,8 @@ msgctxt "" "03090400.xhp\n" "par_idN101EA\n" "help.text" -msgid "<image id=\"img_id3147139\" src=\"media/helpimg/starmath/fu21510.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147139\">Icon</alt></image>" -msgstr "<image id=\"img_id3147139\" src=\"media/helpimg/starmath/fu21510.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147139\">Ikona</alt></image>" +msgid "<image id=\"img_id3147139\" src=\"media/helpimg/starmath/fu21510.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147139\">Cosine Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2325,8 +2325,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10223\n" "help.text" -msgid "<image id=\"img_id3148759\" src=\"media/helpimg/starmath/fu21511.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148759\">Icon</alt></image>" -msgstr "<image id=\"img_id3148759\" src=\"media/helpimg/starmath/fu21511.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148759\">Ikona</alt></image>" +msgid "<image id=\"img_id3148759\" src=\"media/helpimg/starmath/fu21511.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3148759\">Tangent Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2349,8 +2349,8 @@ msgctxt "" "03090400.xhp\n" "par_idN1025C\n" "help.text" -msgid "<image id=\"img_id3149536\" src=\"media/helpimg/starmath/fu21512.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149536\">Icon</alt></image>" -msgstr "<image id=\"img_id3149536\" src=\"media/helpimg/starmath/fu21512.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149536\">Ikona</alt></image>" +msgid "<image id=\"img_id3149536\" src=\"media/helpimg/starmath/fu21512.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149536\">Cotangent Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2373,8 +2373,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10295\n" "help.text" -msgid "<image id=\"img_id3147499\" src=\"media/helpimg/starmath/fu21513.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147499\">Icon</alt></image>" -msgstr "<image id=\"img_id3147499\" src=\"media/helpimg/starmath/fu21513.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147499\">Ikona</alt></image>" +msgid "<image id=\"img_id3147499\" src=\"media/helpimg/starmath/fu21513.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147499\">Hyperbolic Sine Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2397,8 +2397,8 @@ msgctxt "" "03090400.xhp\n" "par_idN102CE\n" "help.text" -msgid "<image id=\"img_id3168610\" src=\"media/helpimg/starmath/fu21503.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3168610\">Icon</alt></image>" -msgstr "<image id=\"img_id3168610\" src=\"media/helpimg/starmath/fu21503.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3168610\">Ikona</alt></image>" +msgid "<image id=\"img_id3168610\" src=\"media/helpimg/starmath/fu21503.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3168610\">Square Root Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2421,8 +2421,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10309\n" "help.text" -msgid "<image id=\"img_id3147608\" src=\"media/helpimg/starmath/fu21514.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147608\">Icon</alt></image>" -msgstr "<image id=\"img_id3147608\" src=\"media/helpimg/starmath/fu21514.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147608\">Ikona</alt></image>" +msgid "<image id=\"img_id3147608\" src=\"media/helpimg/starmath/fu21514.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3147608\">Hyperbolic Cosine Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2445,8 +2445,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10342\n" "help.text" -msgid "<image id=\"img_id3151087\" src=\"media/helpimg/starmath/fu21515.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151087\">Icon</alt></image>" -msgstr "<image id=\"img_id3151087\" src=\"media/helpimg/starmath/fu21515.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151087\">Ikona</alt></image>" +msgid "<image id=\"img_id3151087\" src=\"media/helpimg/starmath/fu21515.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151087\">Hyperbolic Tangent Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2469,8 +2469,8 @@ msgctxt "" "03090400.xhp\n" "par_idN1037C\n" "help.text" -msgid "<image id=\"img_id3151112\" src=\"media/helpimg/starmath/fu21516.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151112\">Icon</alt></image>" -msgstr "<image id=\"img_id3151112\" src=\"media/helpimg/starmath/fu21516.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151112\">Ikona</alt></image>" +msgid "<image id=\"img_id3151112\" src=\"media/helpimg/starmath/fu21516.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3151112\">Hyperbolic Cotangent Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2493,8 +2493,8 @@ msgctxt "" "03090400.xhp\n" "par_idN103B5\n" "help.text" -msgid "<image id=\"img_id3154714\" src=\"media/helpimg/starmath/fu21504.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154714\">Icon</alt></image>" -msgstr "<image id=\"img_id3154714\" src=\"media/helpimg/starmath/fu21504.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154714\">Ikona</alt></image>" +msgid "<image id=\"img_id3154714\" src=\"media/helpimg/starmath/fu21504.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154714\">nth Root Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2517,8 +2517,8 @@ msgctxt "" "03090400.xhp\n" "par_idN103EE\n" "help.text" -msgid "<image id=\"img_id3145633\" src=\"media/helpimg/starmath/fu21517.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145633\">Icon</alt></image>" -msgstr "<image id=\"img_id3145633\" src=\"media/helpimg/starmath/fu21517.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145633\">Ikona</alt></image>" +msgid "<image id=\"img_id3145633\" src=\"media/helpimg/starmath/fu21517.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145633\">Arc Sine Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2541,8 +2541,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10427\n" "help.text" -msgid "<image id=\"img_id3146951\" src=\"media/helpimg/starmath/fu21518.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3146951\">Icon</alt></image>" -msgstr "<image id=\"img_id3146951\" src=\"media/helpimg/starmath/fu21518.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3146951\">Ikona</alt></image>" +msgid "<image id=\"img_id3146951\" src=\"media/helpimg/starmath/fu21518.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3146951\">Arc Cosine Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2565,8 +2565,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10460\n" "help.text" -msgid "<image id=\"img_id3149369\" src=\"media/helpimg/starmath/fu21519.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149369\">Icon</alt></image>" -msgstr "<image id=\"img_id3149369\" src=\"media/helpimg/starmath/fu21519.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149369\">Ikona</alt></image>" +msgid "<image id=\"img_id3149369\" src=\"media/helpimg/starmath/fu21519.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149369\">Arc Tangent Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2589,8 +2589,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10493\n" "help.text" -msgid "<image id=\"img_id3153141\" src=\"media/helpimg/starmath/fu21520.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3153141\">Icon</alt></image>" -msgstr "<image id=\"img_id3153141\" src=\"media/helpimg/starmath/fu21520.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3153141\">Ikona</alt></image>" +msgid "<image id=\"img_id3153141\" src=\"media/helpimg/starmath/fu21520.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3153141\">Arc Cotangent Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2613,8 +2613,8 @@ msgctxt "" "03090400.xhp\n" "par_idN104CC\n" "help.text" -msgid "<image id=\"img_id3154624\" src=\"media/helpimg/starmath/fu21501.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154624\">Icon</alt></image>" -msgstr "<image id=\"img_id3154624\" src=\"media/helpimg/starmath/fu21501.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154624\">Ikona</alt></image>" +msgid "<image id=\"img_id3154624\" src=\"media/helpimg/starmath/fu21501.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154624\">Absolute Value Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2637,8 +2637,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10507\n" "help.text" -msgid "<image id=\"img_id3154023\" src=\"media/helpimg/starmath/fu21521.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154023\">Icon</alt></image>" -msgstr "<image id=\"img_id3154023\" src=\"media/helpimg/starmath/fu21521.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154023\">Ikona</alt></image>" +msgid "<image id=\"img_id3154023\" src=\"media/helpimg/starmath/fu21521.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3154023\">Area Hyperbolic Sine Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2661,8 +2661,8 @@ msgctxt "" "03090400.xhp\n" "par_idN1053A\n" "help.text" -msgid "<image id=\"img_id3149602\" src=\"media/helpimg/starmath/fu21522.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149602\">Icon</alt></image>" -msgstr "<image id=\"img_id3149602\" src=\"media/helpimg/starmath/fu21522.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149602\">Ikona</alt></image>" +msgid "<image id=\"img_id3149602\" src=\"media/helpimg/starmath/fu21522.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3149602\">Area Hyperbolic Cosine Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2685,8 +2685,8 @@ msgctxt "" "03090400.xhp\n" "par_idN10573\n" "help.text" -msgid "<image id=\"img_id3155342\" src=\"media/helpimg/starmath/fu21523.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155342\">Icon</alt></image>" -msgstr "<image id=\"img_id3155342\" src=\"media/helpimg/starmath/fu21523.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155342\">Ikona</alt></image>" +msgid "<image id=\"img_id3155342\" src=\"media/helpimg/starmath/fu21523.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3155342\">Area Hyperbolic Tangent Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2709,8 +2709,8 @@ msgctxt "" "03090400.xhp\n" "par_idN105AC\n" "help.text" -msgid "<image id=\"img_id3150842\" src=\"media/helpimg/starmath/fu21524.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150842\">Icon</alt></image>" -msgstr "<image id=\"img_id3150842\" src=\"media/helpimg/starmath/fu21524.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150842\">Ikona</alt></image>" +msgid "<image id=\"img_id3150842\" src=\"media/helpimg/starmath/fu21524.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3150842\">Area Hyperbolic Cotangent Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2733,8 +2733,8 @@ msgctxt "" "03090400.xhp\n" "par_idN105E5\n" "help.text" -msgid "<image id=\"img_id3145301\" src=\"media/helpimg/starmath/fu21502.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145301\">Icon</alt></image>" -msgstr "<image id=\"img_id3145301\" src=\"media/helpimg/starmath/fu21502.png\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145301\">Ikona</alt></image>" +msgid "<image id=\"img_id3145301\" src=\"media/helpimg/starmath/fu21502.svg\" width=\"0.3335inch\" height=\"0.3335inch\"><alt id=\"alt_id3145301\">Factorial Icon</alt></image>" +msgstr "" #: 03090400.xhp msgctxt "" @@ -2757,8 +2757,8 @@ msgctxt "" "03090400.xhp\n" "par_id3147546\n" "help.text" -msgid "You can also assign an index or an exponent to a function. For example, typing <emph>sin^2x</emph> results in in a function \"sine to the power of 2x\"." -msgstr "Funkcji można także przypisać indeks lub wykładnik. Na przykład wpisanie ciągu <emph>sin^2x</emph> daje funkcję \"sinus do potęgi 2x\"." +msgid "You can also assign an index or an exponent to a function. For example, typing <emph>sin^2x</emph> results in a function \"sine to the power of 2x\"." +msgstr "" #: 03090400.xhp msgctxt "" @@ -4573,8 +4573,8 @@ msgctxt "" "03090700.xhp\n" "par_id3149966\n" "help.text" -msgid "The standard centralized formulas can be aligned to the left without using the <emph>Format - Alignment</emph> menu. To do this, place an empty character string, that is, the inverted commas which surround any text \"\", before the section of formula that you want to align. For example, typing <emph>\"\" a+b newline \"\" c+d</emph> results in both equations being left-aligned instead of centered." -msgstr "Standardowe, scentralizowane formuły można wyrównać do lewej, nie używając menu <emph>Format - Wyrównanie</emph>. W tym celu należy wstawić pusty ciąg znaków, tj. cudzysłowy z dowolnym tekstem \"\", przed sekcją wyrównywanej formuły. Na przykład wpisanie <emph>\"\" a+b newline \"\" c+d</emph> powoduje wyrównanie obu równań do lewej, a nie ich wyśrodkowanie." +msgid "The standard centralized formulas can be aligned to the left without using the <emph>Format - Align</emph> menu. To do this, place an empty character string, that is, the inverted commas which surround any text \"\", before the section of formula that you want to align. For example, typing <emph>\"\" a+b newline \"\" c+d</emph> results in both equations being left-aligned instead of centered." +msgstr "" #: 03090700.xhp msgctxt "" @@ -5557,8 +5557,8 @@ msgctxt "" "03091100.xhp\n" "bm_id3147341\n" "help.text" -msgid "<bookmark_value>brackets and grouping in $[officename] Math</bookmark_value><bookmark_value>grouping and brackets in $[officename] Math</bookmark_value>" -msgstr "<bookmark_value>nawiasy i grupowanie, $[officename] Math</bookmark_value><bookmark_value>grupowanie i nawiasy;,$[officename] Math</bookmark_value>" +msgid "<bookmark_value>brackets and grouping in Math</bookmark_value> <bookmark_value>grouping and brackets in Math</bookmark_value>" +msgstr "" #: 03091100.xhp msgctxt "" @@ -5573,8 +5573,8 @@ msgctxt "" "03091100.xhp\n" "par_id3150342\n" "help.text" -msgid "Note: the quotation marks in the examples are used to emphasize text and do not belong to the content of the formulas and commands." -msgstr "Uwaga: cudzysłowy w przykładach służą do wyróżnienia tekstu i nie są częścią formuł i poleceń." +msgid "The quotation marks in the examples are used to emphasize text and do not belong to the content of the formulas and commands." +msgstr "" #: 03091100.xhp msgctxt "" @@ -5589,8 +5589,8 @@ msgctxt "" "03091100.xhp\n" "par_id3149054\n" "help.text" -msgid "Braces \"{}\" are used to group expressions together to form one new expression. For example, \"sqrt {x * y}\" is the square root of the entire product x*y, while \"sqrt x * y\" is the square root of x multiplied by y. Braces do not require an extra space." -msgstr "Nawiasy klamrowe \"{}\" służą do grupowania wyrażeń w celu utworzenia nowego wyrażenia. Na przykład wyrażenie \"sqrt {x * y}\" jest pierwiastkiem kwadratowym całego produktu x*y, a wyrażenie \"sqrt x * y\" jest pierwiastkiem kwadratowym x pomnożonego przez y. Nawiasy klamrowe nie wymagają dodatkowej spacji." +msgid "Braces \"{}\" are used to group expressions together to form one new expression. For example, <input>sqrt {x * y}</input> is the square root of the entire product x*y, while <input>sqrt x * y</input> is the square root of x multiplied by y. Braces do not require an extra space." +msgstr "" #: 03091100.xhp msgctxt "" @@ -5605,16 +5605,16 @@ msgctxt "" "03091100.xhp\n" "par_id3147403\n" "help.text" -msgid "There are a total of eight (8) different types of brackets available. The \"ceil\" and \"floor\" brackets are often used for rounding up or down the argument to the next integer: \"lceil -3.7 rceil = -3\" or \"lfloor -3.7 rfloor = -4\"." -msgstr "W sumie dostępnych jest osiem (8) różnych typów nawiasów. Górny i dolny nawias ograniczający są często używane do zaokrąglania argumentu w górę lub w dół do najbliższej liczby całkowitej: \"lceil -3.7 rceil = -3\" lub \"lfloor -3.7 rfloor = -4\"." +msgid "There are a total of eight (8) different types of brackets available. The \"ceil\" and \"floor\" brackets are often used for rounding up or down the argument to the next integer: <input>lceil -3.7 rceil = -3</input> or <input>lfloor -3.7 rfloor = -4</input>." +msgstr "" #: 03091100.xhp msgctxt "" "03091100.xhp\n" "par_id3146320\n" "help.text" -msgid "Operator brackets, also known as Bra-kets (angle brackets with a vertical line in between), are common in Physics notation: \"langle a mline b rangle\" or \"langle a mline b mline c over d mline e rangle\". The height and positioning of the vertical lines always corresponds exactly to the enclosing brackets." -msgstr "Nawiasy operatora, znane także jako nawiasy ostre z linią pionową w środku, są często używane w notacji fizycznej: \"langle a mline b rangle\" lub \"langle a mline b mline c over d mline e rangle\". Wysokość i rozmieszczenie linii pionowych zawsze dokładnie odpowiada nawiasom zamykającym." +msgid "Operator brackets, also known as Bra-kets (angle brackets with a vertical line in between), are common in Physics notation: <input>langle a mline b rangle</input> or <input>langle a mline b mline c over d mline e rangle</input>. The height and positioning of the vertical lines always corresponds exactly to the enclosing brackets." +msgstr "" #: 03091100.xhp msgctxt "" @@ -5645,8 +5645,8 @@ msgctxt "" "03091100.xhp\n" "par_id3154562\n" "help.text" -msgid "Brackets do not adjust their size to the enclosed expression. For example, if you want \"( a over b )\" with a bracket size adjusted to a and b you must insert \"left\" and \"right\". Entering \"left(a over b right)\" produces appropriate sizing. If, however, the brackets themselves are part of the expression whose size is changed, they are included the size change: \"size 3(a over b)\" and \"size 12(a over b)\". The sizing of the bracket-to-expression ratio does not change in any way." -msgstr "Rozmiar nawiasów nie jest automatycznie dostosowywany do zawartego w nich wyrażenia. Na przykład aby rozmiar nawiasu z wyrażeniem \"( a over b )\" był odpowiednio dostosowywany, należy wprowadzić operatory \"left\" i \"right\". Dzięki wprowadzeniu wyrażenia \"left(a over b right)\" uzyskuje się odpowiedni rozmiar. Jeśli jednak same nawiasy są częścią wyrażenia, którego rozmiar został zmieniony, są uwzględniane w zmianie rozmiaru: \"size 3(a over b)\" i \"size 12(a over b)\". Współczynnik skalowania wyrażenia w nawiasach nie zmienia się." +msgid "Brackets do not adjust their size to the enclosed expression. For example, if you want <input>( a over b )</input> with a bracket size adjusted to a and b you must insert \"left\" and \"right\". Entering <input>left(a over b right)</input> produces appropriate sizing. If, however, the brackets themselves are part of the expression whose size is changed, they are included the size change: <input>size 3(a over b)</input> and <input>size 12(a over b)</input>. The sizing of the bracket-to-expression ratio does not change in any way." +msgstr "" #: 03091100.xhp msgctxt "" @@ -5659,38 +5659,6 @@ msgstr "Ponieważ operatory \"left\" i \"right\" zapewniają jednoznaczne przypi #: 03091100.xhp msgctxt "" "03091100.xhp\n" -"par_id3150014\n" -"help.text" -msgid "left lbrace x right none" -msgstr "left lbrace x right none" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3149877\n" -"help.text" -msgid "left [ x right )" -msgstr "left [ x right )" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3145241\n" -"help.text" -msgid "left ] x right [" -msgstr "left ] x right [" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3156060\n" -"help.text" -msgid "left rangle x right lfloor" -msgstr "left rangle x right lfloor" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" "par_id3150935\n" "help.text" msgid "The same rules apply to \"left\" and \"right\" as to the other brackets: they also work as group builders and may enclose empty expressions." @@ -5717,8 +5685,8 @@ msgctxt "" "03091100.xhp\n" "par_id3147169\n" "help.text" -msgid "Using \"left\" and \"right\" makes the above expression valid in $[officename] Math: \"left [2, 3 right )\". However, the brackets do not have any fixed size because they adjust to the argument. Setting a single bracket is a bit cumbersome. Therefore, there you can display single brackets with a fixed size by placing a \"\\\" (backslash) in front of normal brackets. These brackets then act like any other symbol and no longer have the special functionality of brackets; that is they do not work as group builders and their orientation corresponds to that of other symbols. See \"size *2 \\langle x \\rangle\" and \"size *2 langle x rangle\"." -msgstr "Dzięki użyciu poleceń \"left\" i \"right\" powyższe wyrażenie jest prawidłowe w aplikacji $[officename] Math: \"left [2, 3 right )\". Jednak nawiasy nie mają stałego rozmiaru, ponieważ dostosowują się do argumentu. Ustawienie jednego nawiasu jest dość kłopotliwe. Dlatego można wyświetlić nawiasy pojedyncze o stałym rozmiarze, umieszczając ukośnik \"\\\" przed nawiasami zwykłymi. Nawiasy te działają jak każdy inny symbol i nie mają już funkcji specjalnych, tj. nie służą do tworzenia grup, a ich orientacja odpowiada orientacji innych symboli. Zobacz \"size *2 \\langle x \\rangle\" i \"size *2 langle x rangle\"." +msgid "Using \"left\" and \"right\" makes the above expression valid in $[officename] Math: <input>left [2, 3 right )</input>. However, the brackets do not have any fixed size because they adjust to the argument. Setting a single bracket is a bit cumbersome. Therefore, there you can display single brackets with a fixed size by placing a \"\\\" (backslash) in front of normal brackets. These brackets then act like any other symbol and no longer have the special functionality of brackets; that is they do not work as group builders and their orientation corresponds to that of other symbols. See <input>size *2 \\langle x \\rangle</input> and <input>size *2 langle x rangle</input>." +msgstr "" #: 03091100.xhp msgctxt "" @@ -5739,62 +5707,6 @@ msgstr "\\{ lub \\lbrace, \\} lub \\rbrace" #: 03091100.xhp msgctxt "" "03091100.xhp\n" -"par_id3150756\n" -"help.text" -msgid "\\(, \\)" -msgstr "\\(, \\)" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3145207\n" -"help.text" -msgid "\\[, \\]" -msgstr "\\[, \\]" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3153153\n" -"help.text" -msgid "\\langle, \\rangle" -msgstr "\\langle, \\rangle" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3150263\n" -"help.text" -msgid "\\lceil, \\rceil" -msgstr "\\lceil, \\rceil" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3147252\n" -"help.text" -msgid "\\lfloor, \\rfloor" -msgstr "\\lfloor, \\rfloor" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3154690\n" -"help.text" -msgid "\\lline, \\rline" -msgstr "\\lline, \\rline" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3145414\n" -"help.text" -msgid "\\ldline, \\rdline" -msgstr "\\ldline, \\rdline" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" "par_id3147514\n" "help.text" msgid "In this way, intervals like the one above can be built in <emph>$[officename] Math</emph> without any problems: \\[2\", \"3\\) or \"\\]2\", \"3\\[ (Attention: These quotation marks are part of the entry.)" @@ -5813,24 +5725,24 @@ msgctxt "" "03091100.xhp\n" "par_id3153674\n" "help.text" -msgid "Nesting groups within each other is relatively problem-free. In the formula hat \"{a + b}\" the \"hat\" is displayed simply over the center of \"{a + b}\". Also, \"color red lceil a rceil\" and \"grave hat langle x * y rangle\" work as expected. The result of the latter can be compared to \"grave {hat langle x * y rangle}\". These attributes do not compete, but rather can be combined." -msgstr "Osadzanie grup w innych grupach jest dość łatwe. W formule hat \"{a + b}\" wyrażenie \"hat\" jest po prostu wyświetlane na środkiem wyrażenia \"{a + b}\". Polecenia \"color red lceil a rceil\" i \"grave hat langle x * y rangle\" także działają prawidłowo. Wynik działania drugiego z nich można porównać do działania formuły \"grave {hat langle x * y rangle}\". Atrybuty te nie wykluczają się wzajemnie i zazwyczaj można je łączyć." +msgid "Nesting groups within each other is relatively problem-free. In the formula <input>hat \"{a + b}\"</input> the \"hat\" is displayed simply over the center of \"{a + b}\". Also, <input>color red lceil a rceil</input> and <input>grave hat langle x * y rangle</input> work as expected. The result of the latter can be compared to <input>grave {hat langle x * y rangle}</input>. These attributes do not compete, but rather can be combined." +msgstr "" #: 03091100.xhp msgctxt "" "03091100.xhp\n" "par_id3147526\n" "help.text" -msgid "This differs slightly for competing or mutually influencing attributes. This is often the case with font attributes. For example, which color does the b have in \"color yellow color red (a + color green b)\", or which size does it have in \"size *4 (a + size /2 b)\"? Given a base size of 12, does it have the size 48, 6 or even 24 (which could be seen as a combination)? The following are basic resolution rules, which will be followed consistently in the future. In general, the rules apply to all group operations. This only has a visible effect on the font attributes, like \"bold\", \"ital\", \"phantom\", \"size\", \"color\" and \"font\":" -msgstr "Ten przypadek różni się nieco w przypadku atrybutów wykluczających się wzajemnie lub zależnych od siebie. Często występuje on w atrybutach czcionek. Na przykład, jaki kolor ma b w formule \"color yellow color red (a + color green b)\" lub jaki ma rozmiar w formule \"size *4 (a + size /2 b)\"? Jeśli przyjmiemy rozmiar podstawowy 12, to czy litera ma rozmiar 48, 6 czy nawet 24 (co można interpretować jako kombinację)? Poniżej znajdują się podstawowe reguły rozwiązywania takich problemów. Można je konsekwentnie stosować w przyszłości. Reguły dotyczą wszystkich operacji grupowych. Ma to widoczny wpływ tylko na atrybuty czcionek, np. \"bold\", \"ital\", \"phantom\", \"size\", \",color\" i \"font\":" +msgid "This differs slightly for competing or mutually influencing attributes. This is often the case with font attributes. For example, which color does the b have in <input>color yellow color red (a + color green b)</input>, or which size does it have in <input>size *4 (a + size /2 b)</input>? Given a base size of 12, does it have the size 48, 6 or even 24 (which could be seen as a combination)? The following are basic resolution rules, which will be followed consistently in the future. In general, the rules apply to all group operations. This only has a visible effect on the font attributes, like \"bold\", \"ital\", \"phantom\", \"size\", \"color\" and \"font\":" +msgstr "" #: 03091100.xhp msgctxt "" "03091100.xhp\n" "par_id3152952\n" "help.text" -msgid "Group operations in sequence are treated as if every single operation is enclosed by braces. They are nested, and in every level there can be no more than one operation. Here is an example of a formula with many group operations: \"size 12 color red font sans size -5 (a + size 8 b)\" like \"{size 12{color red{font sans{size -5 (a + {size 8 b})}}}}\"." -msgstr "Kolejne operacje grupowe są traktowane jakby każda operacja znajdowała się w nawiasach. Są one osadzone i na każdym poziomie może być tylko jedna operacja. Przykład formuły z wieloma operacjami grupowymi: \"size 12 color red font sans size -5 (a + size 8 b)\" tak jak \"{size 12{color red{font sans{size -5 (a + {size 8 b})}}}}\"." +msgid "Group operations in sequence are treated as if every single operation is enclosed by braces. They are nested, and in every level there can be no more than one operation. Here is an example of a formula with many group operations:" +msgstr "" #: 03091100.xhp msgctxt "" @@ -5845,8 +5757,8 @@ msgctxt "" "03091100.xhp\n" "par_id3150994\n" "help.text" -msgid "A group operation does not have any effect on higher-level operations but rather affects only lower-level groups and expressions, including their brackets and super-/subscripts. For example, \"a + size *2 (b * size -8 c_1)^2\"" -msgstr "Operacja grupowa nie ma wpływu na operacje wyższego rzędu, ale tylko na grupy i wyrażenia niższego rzędu, w tym ich nawiasy i indeksy górne i dolne. Na przykład wyrażenie \"a + size *2 (b * size -8 c_1)^2\"" +msgid "A group operation does not have any effect on higher-level operations but rather affects only lower-level groups and expressions, including their brackets and super-/subscripts. For example," +msgstr "" #: 03091100.xhp msgctxt "" @@ -5869,32 +5781,16 @@ msgctxt "" "03091100.xhp\n" "par_id3146934\n" "help.text" -msgid "\"size *2 size -5 a\" would be double the starting size minus 5" -msgstr "\"size *2 size -5 a\" - podwójny rozmiar początkowy minus 5" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3149297\n" -"help.text" -msgid "\"font sans ( a + font serif b)\"" -msgstr "\"font sans ( a + font serif b)\"" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3155174\n" -"help.text" -msgid "\"size *2 ( a + size /2 b )\"" -msgstr "\"size *2 ( a + size /2 b )\"" +msgid "<input>size *2 size -5 a</input> would be double the starting size minus 5" +msgstr "" #: 03091100.xhp msgctxt "" "03091100.xhp\n" "par_id3154906\n" "help.text" -msgid "To change the size of a formula, use \"size +\" or -,*,/. Do not use \"size n\". These can easily be used in any context. This enables you to copy to other areas by using Copy and Paste, and the result remains the same. Furthermore, such expressions survive a change of base size in the menu better than when using \"size n\". If you use only \"size *\" and \"size /\" (for example, \"size *1.24 a or size /0.86 a\") the proportions remain intact." -msgstr "Aby zmienić rozmiar formuły, użyj polecenia \"size +\" lub znaku -,*,/. Nie używaj polecenia \"size n\". Można ich używać w dowolnym kontekście. Umożliwia to kopiowanie do innych obszarów za pomocą poleceń Kopiuj i Wklej, a wynik jest ten sam. Ponadto takie wyrażenia są bardziej \"odporne\" na zmianę rozmiaru podstawowego niż w przypadku używania polecenia \"size n\". Jeśli użyjesz tylko polecenia \"size *\" i \"size /\" (np. \"size *1.24 a or size /0.86 a\"), proporcje się nie zmieniają." +msgid "To change the size of a formula, use \"size +\" or -,*,/. Do not use \"size n\". These can easily be used in any context. This enables you to copy to other areas by using Copy and Paste, and the result remains the same. Furthermore, such expressions survive a change of base size in the menu better than when using \"size n\". If you use only <input>size *</input> and <input>size /</input> (for example, <input>size *1.24 a</input> or <input>size /0.86 a</input>) the proportions remain intact." +msgstr "" #: 03091100.xhp msgctxt "" @@ -5909,48 +5805,24 @@ msgctxt "" "03091100.xhp\n" "par_id3148734\n" "help.text" -msgid "Exactly identical proportions with \"size 18 a_n\" and \"size *1.5 a_n\"." -msgstr "Identyczne proporcje - \"size 18 a_n\" i \"size *1.5 a_n\"." +msgid "Exactly identical proportions with <input>size 18 a_n</input> and <input>size *1.5 a_n</input>." +msgstr "" #: 03091100.xhp msgctxt "" "03091100.xhp\n" "par_id3152766\n" "help.text" -msgid "This differs in different contexts: \"x^{size 18 a_n}\" and \"x^{size *1.5 a_n}\"" -msgstr "Ma to różne zastosowanie w różnych kontekstach: \"x^{size 18 a_n}\" i \"x^{size *1.5 a_n}\"" +msgid "This differs in different contexts: <input>x^{size 18 a_n}</input> and <input>x^{size *1.5 a_n}</input>" +msgstr "" #: 03091100.xhp msgctxt "" "03091100.xhp\n" "par_id3157986\n" "help.text" -msgid "Examples with size +n for a comparison. They look identical:" -msgstr "Przykładowe polecenia size +n dla porównania. Wyglądają identycznie:" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3158001\n" -"help.text" -msgid "a_{size 8 n}" -msgstr "a_{size 8 n}" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3147332\n" -"help.text" -msgid "a_{size +2 n}" -msgstr "a_{size +2 n}" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3155143\n" -"help.text" -msgid "a_{size *1.333 n}" -msgstr "a_{size *1.333 n}" +msgid "Examples with <input>size +n</input> for a comparison. They look identical:" +msgstr "" #: 03091100.xhp msgctxt "" @@ -5963,34 +5835,10 @@ msgstr "Jednak poniższe przykłady nie wyglądają identycznie:" #: 03091100.xhp msgctxt "" "03091100.xhp\n" -"par_id3147073\n" -"help.text" -msgid "x^{a_{size 8 n}}" -msgstr "x^{a_{size 8 n}}" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3147086\n" -"help.text" -msgid "x^{a_{size +2 n}}" -msgstr "x^{a_{size +2 n}}" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" -"par_id3154386\n" -"help.text" -msgid "x^{a_{size *1.333 n}}" -msgstr "x^{a_{size *1.333 n}}" - -#: 03091100.xhp -msgctxt "" -"03091100.xhp\n" "par_id3153354\n" "help.text" -msgid "Note that all n here have different sizes. The size 1.333 results from 8/6, the desired size divided by the default index size 6. (Index size 50% with a base size of 12)" -msgstr "Należy zwrócić uwagę, że n odpowiada tutaj różnym rozmiarom. Rozmiar 1.333 wynika z wartości 8/6 uzyskanej w wyniku podzielenia rozmiaru docelowego przez domyślny rozmiar indeksu 6 (rozmiar indeksu 50% przy rozmiarze podstawowym 12)" +msgid "All n here have different sizes. The size 1.333 results from 8/6, the desired size divided by the default index size 6. (Index size 50% with a base size of 12)" +msgstr "" #: 03091200.xhp msgctxt "" @@ -6043,30 +5891,6 @@ msgstr "Stosowanie poniższych wzorów nie jest już możliwe" #: 03091200.xhp msgctxt "" "03091200.xhp\n" -"par_id3149029\n" -"help.text" -msgid "a_2_3" -msgstr "a_2_3" - -#: 03091200.xhp -msgctxt "" -"03091200.xhp\n" -"par_id3155985\n" -"help.text" -msgid "a^2^3" -msgstr "a^2^3" - -#: 03091200.xhp -msgctxt "" -"03091200.xhp\n" -"par_id3153923\n" -"help.text" -msgid "a_2^3_4" -msgstr "a_2^3_4" - -#: 03091200.xhp -msgctxt "" -"03091200.xhp\n" "par_id3153724\n" "help.text" msgid "Each sub-/superscript position of a base character can only be used once. You must use brackets to indicate the desired result. The following examples illustrate this" @@ -6075,38 +5899,6 @@ msgstr "Każdą pozycję indeksu dolnego lub górnego znaku podstawowego można #: 03091200.xhp msgctxt "" "03091200.xhp\n" -"par_id3151185\n" -"help.text" -msgid "a_{2_3}" -msgstr "a_{2_3}" - -#: 03091200.xhp -msgctxt "" -"03091200.xhp\n" -"par_id3151272\n" -"help.text" -msgid "a^{2^3}" -msgstr "a^{2^3}" - -#: 03091200.xhp -msgctxt "" -"03091200.xhp\n" -"par_id3156316\n" -"help.text" -msgid "a_2^{3_4}" -msgstr "a_2^{3_4}" - -#: 03091200.xhp -msgctxt "" -"03091200.xhp\n" -"par_id3145207\n" -"help.text" -msgid "a_{2^3}^{4_5}" -msgstr "a_{2^3}^{4_5}" - -#: 03091200.xhp -msgctxt "" -"03091200.xhp\n" "par_id3151173\n" "help.text" msgid "Unlike other formula editors where \"<emph>_</emph>\" and \" <emph>^</emph> \" only refer to the next character (\"a_24\" refers only to the \"2\"), $[officename] Math refers to the entire number(s)/name(s)/text. If you want to put superscripts and subscripts in sequence, the expression can be written as follows: a_2{}^3 or a^3{}_2" |