"logarithmand" meaning in English

{
  "etymology_templates": [
    {
      "args": {
        "1": "en",
        "2": "de",
        "3": "Logarithmand"
      },
      "expansion": "German Logarithmand",
      "name": "bor"
    },
    {
      "args": {
        "1": "en",
        "2": "logarithm",
        "3": "-and"
      },
      "expansion": "By surface analysis, logarithm + -and",
      "name": "surface analysis"
    }
  ],
  "etymology_text": "Borrowed from German Logarithmand. By surface analysis, logarithm + -and.",
  "forms": [
    {
      "form": "logarithmands",
      "tags": [
        "plural"
      ]
    }
  ],
  "head_templates": [
    {
      "args": {},
      "expansion": "logarithmand (plural logarithmands)",
      "name": "en-noun"
    }
  ],
  "lang": "English",
  "lang_code": "en",
  "pos": "noun",
  "senses": [
    {
      "categories": [
        {
          "kind": "other",
          "name": "English entries with incorrect language header",
          "parents": [
            "Entries with incorrect language header",
            "Entry maintenance"
          ],
          "source": "w"
        },
        {
          "kind": "other",
          "name": "English terms suffixed with -and",
          "parents": [],
          "source": "w"
        },
        {
          "kind": "other",
          "name": "Pages with 1 entry",
          "parents": [],
          "source": "w"
        },
        {
          "kind": "other",
          "name": "Pages with entries",
          "parents": [],
          "source": "w"
        }
      ],
      "examples": [
        {
          "ref": "1843, Alexander John Ellis, transl., The Spirit of Mathematical Analysis, and Its Relation to a Logical System, London: John W[illiam] Parker, […], translation of original by Martin Ohm, part I (The Relation of the Four First Operations to One Another. Elementary Algebra.), chapter 3, section 29 (Idea of Actual Logarithm), page 36:",
          "text": "Let us now understand by an actual logarithm, a symbol of the form log a, in which a is any positive number, while b is any positive number > 1, and which denotes such a positive or negative number or zero, that when the “base” b is potentiated by it, the result will be the “logarithmand” a,—the actual logarithm therefore will always have a value and never more than one, and that value is negative, zero, or positive, according as the logarithmand is < 1, = 1, or > 1.",
          "type": "quote"
        },
        {
          "ref": "1956, Ernst Weber, Linear Transient Analysis, Volume II: Two-Terminal-Pair Networks, Transmission Lines, New York, N.Y.: John Wiley & Sons, Inc.; London: Chapman & Hall, Limited, page 200:",
          "text": "We thus have for ω < Ωₑ, inverting the logarithmand[…]",
          "type": "quote"
        },
        {
          "ref": "1992, “Laser Gas-Kinetics: […]”, in O. N. Tselikova, V. S. Potapchouk, transl., edited by Elliott H. Lieb, Wolf Beiglböck, Tullio Regge, Robert P. Geroch, and Walter Thirring, Intense Resonant Interactions in Quantum Electronics (Texts and Monographs in Physics), Springer-Verlag, translation of Intensivnye resonansnye vsaimodeistviya v kvantovoi elektronike by V. M. Akulin and N. V. Karlov, →DOI, →ISBN, page 73:",
          "text": "At small frequency detuning ΔT₂ ≪ 1 and field strength μ₂₁Ɛ₀ ≪ ħT₁⁻¹, the logarithmand may be expanded into a power series.",
          "type": "quote"
        }
      ],
      "glosses": [
        "The number for which one is obtaining a logarithm. Thus, if a = bᵉ, then e is the logarithm (base b) of a, and a is the logarithmand."
      ],
      "id": "en-logarithmand-en-noun-DWk4ILN6",
      "raw_glosses": [
        "(rare) The number for which one is obtaining a logarithm. Thus, if a = bᵉ, then e is the logarithm (base b) of a, and a is the logarithmand."
      ],
      "related": [
        {
          "word": "antilogarithm"
        }
      ],
      "tags": [
        "rare"
      ]
    }
  ],
  "word": "logarithmand"
}

{
  "etymology_templates": [
    {
      "args": {
        "1": "en",
        "2": "de",
        "3": "Logarithmand"
      },
      "expansion": "German Logarithmand",
      "name": "bor"
    },
    {
      "args": {
        "1": "en",
        "2": "logarithm",
        "3": "-and"
      },
      "expansion": "By surface analysis, logarithm + -and",
      "name": "surface analysis"
    }
  ],
  "etymology_text": "Borrowed from German Logarithmand. By surface analysis, logarithm + -and.",
  "forms": [
    {
      "form": "logarithmands",
      "tags": [
        "plural"
      ]
    }
  ],
  "head_templates": [
    {
      "args": {},
      "expansion": "logarithmand (plural logarithmands)",
      "name": "en-noun"
    }
  ],
  "lang": "English",
  "lang_code": "en",
  "pos": "noun",
  "related": [
    {
      "word": "antilogarithm"
    }
  ],
  "senses": [
    {
      "categories": [
        "English countable nouns",
        "English entries with incorrect language header",
        "English lemmas",
        "English nouns",
        "English terms borrowed from German",
        "English terms derived from German",
        "English terms suffixed with -and",
        "English terms with quotations",
        "English terms with rare senses",
        "Pages with 1 entry",
        "Pages with entries"
      ],
      "examples": [
        {
          "ref": "1843, Alexander John Ellis, transl., The Spirit of Mathematical Analysis, and Its Relation to a Logical System, London: John W[illiam] Parker, […], translation of original by Martin Ohm, part I (The Relation of the Four First Operations to One Another. Elementary Algebra.), chapter 3, section 29 (Idea of Actual Logarithm), page 36:",
          "text": "Let us now understand by an actual logarithm, a symbol of the form log a, in which a is any positive number, while b is any positive number > 1, and which denotes such a positive or negative number or zero, that when the “base” b is potentiated by it, the result will be the “logarithmand” a,—the actual logarithm therefore will always have a value and never more than one, and that value is negative, zero, or positive, according as the logarithmand is < 1, = 1, or > 1.",
          "type": "quote"
        },
        {
          "ref": "1956, Ernst Weber, Linear Transient Analysis, Volume II: Two-Terminal-Pair Networks, Transmission Lines, New York, N.Y.: John Wiley & Sons, Inc.; London: Chapman & Hall, Limited, page 200:",
          "text": "We thus have for ω < Ωₑ, inverting the logarithmand[…]",
          "type": "quote"
        },
        {
          "ref": "1992, “Laser Gas-Kinetics: […]”, in O. N. Tselikova, V. S. Potapchouk, transl., edited by Elliott H. Lieb, Wolf Beiglböck, Tullio Regge, Robert P. Geroch, and Walter Thirring, Intense Resonant Interactions in Quantum Electronics (Texts and Monographs in Physics), Springer-Verlag, translation of Intensivnye resonansnye vsaimodeistviya v kvantovoi elektronike by V. M. Akulin and N. V. Karlov, →DOI, →ISBN, page 73:",
          "text": "At small frequency detuning ΔT₂ ≪ 1 and field strength μ₂₁Ɛ₀ ≪ ħT₁⁻¹, the logarithmand may be expanded into a power series.",
          "type": "quote"
        }
      ],
      "glosses": [
        "The number for which one is obtaining a logarithm. Thus, if a = bᵉ, then e is the logarithm (base b) of a, and a is the logarithmand."
      ],
      "raw_glosses": [
        "(rare) The number for which one is obtaining a logarithm. Thus, if a = bᵉ, then e is the logarithm (base b) of a, and a is the logarithmand."
      ],
      "tags": [
        "rare"
      ]
    }
  ],
  "word": "logarithmand"
}