File:Logarithm inversefunctiontoexp.svg

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Summary

Description	English: Logarithm function as the inverse of an exponential, shown on the same graph together with the 45° “mirror line”.
Date	4 March 2011
Source	Own work
Author	Stpasha

Source code in Mathematica

t = 3;
g2 = Plot[{Log[2, x], 2^x}, {x, -3, 5}, 
  PlotRange -> {{-2, 4.5}, {-3, 5}}, AspectRatio -> 8/6.5, 
  ImageSize -> 240,
  PlotStyle -> {{Thickness[0.007], Blue}, {Thickness[0.007], 
     Darker[Red]}},
  AxesStyle -> 
   Directive[FontSize -> 12, FontFamily -> "Arial", 
    Thickness[0.003]],
  AxesLabel -> {"x", None},
  Ticks -> {{{Log[2, t], "\!\(\*SubscriptBox[\"log\", \"b\"]\)(\!\(\*
StyleBox[\"t\",\nFontSlant->\"Italic\"]\))"}, {t, "\!\(\*
StyleBox[\"t\",\nFontSlant->\"Italic\"]\)"}}, {{Log[2, t], 
      "\!\(\*SubscriptBox[\"log\", \"b\"]\)(\!\(\*
StyleBox[\"t\",\nFontSlant->\"Italic\"]\))"}, {t, "\!\(\*
StyleBox[\"t\",\nFontSlant->\"Italic\"]\)"}}},
  Epilog -> {
    Line[{{-2.3, -2.3}, {3.5, 3.5}}],
    Line[{{t, Log[2, t]}, {Log[2, t], t}}],
    Dotted, Gray,
    Line[{{Log[2, t], 0}, {Log[2, t], 5}}],
    Line[{{t, 0}, {t, Log[2, t]}}],
    Line[{{0, Log[2, t]}, {4, Log[2, t]}}],
    Line[{{0, t}, {Log[2, t], t}}],
    Black, PointSize[Medium],
    Point[{{t, Log[2, t]}, {Log[2, t], t}}],
    FontSize -> 12, FontFamily -> "Arial",
    Inset["\!\(\*SuperscriptBox[\"b\", \"x\"]\)", {2.5, 4.2}],
    Inset[
     "\!\(\*SubscriptBox[\"log\", \"b\"]\)\!\(\*AdjustmentBox[\"(\",\n\
BoxMargins->{{-0.12355212355212356`, 0.12355212355212356`}, {0., \
0.}}]\)\!\(\*AdjustmentBox[\"x\",\n\
BoxMargins->{{-0.12355212355212356`, 0.12355212355212356`}, {0., \
0.}}]\)\!\(\*AdjustmentBox[\")\",\n\
BoxMargins->{{-0.12355212355212356`, 0.12355212355212356`}, {0., \
0.}}]\)", {3.7, 2.3}]
    }]
Export["Logarithm_inversefunctiontoexp.svg", g2]

Licensing

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	This file is made available under the Creative Commons CC0 1.0 Universal Public Domain Dedication.
	The person who associated a work with this deed has dedicated the work to the public domain by waiving all of his or her rights to the work worldwide under copyright law, including all related and neighboring rights, to the extent allowed by law. You can copy, modify, distribute and perform the work, even for commercial purposes, all without asking permission. CC0falsefalse

File usage

The following pages on Schools Wikipedia link to this image (list may be incomplete):

Logarithm

Metadata

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