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Definition of Irresoluble
1. a. Incapable of being dissolved or resolved into parts; insoluble.
Definition of Irresoluble
1. Adjective. difficult if not impossible to resolve; irresolvable ¹
¹ Source: wiktionary.com
Definition of Irresoluble
1. [adj]
Lexicographical Neighbors of Irresoluble
Literary usage of Irresoluble
Below you will find example usage of this term as found in modern and/or classical literature:
1. Theory of Differential Equations by Andrew Russell Forsyth (1900)
"irresoluble FACTORS [109. 109. The discriminant may provide several roots.
If it is an irresoluble function of w, these roots form one set. ..."
2. A new dictionary of the English language by Charles Richardson (1839)
"Bp. Hall appears to mean by irresoluble, —that cannot be freed, released or
relieved, (from guilt or the pangs of guilt ;) that cannot be calmed, quieted, ..."
3. A Treatise on Differential Equations by Andrew Russell Forsyth (1903)
"For the present purpose therefore the equation in p may be considered irresoluble:
if it can be resolved into factors which are not linear and not resoluble ..."
4. Theory of Functions of a Complex Variable by Andrew Russell Forsyth (1893)
"Our purpose, however, is to regard z as the most general form of algebraical
variable and therefore as an irresoluble entity ; so ..."
5. Theory of Differential Equations by Andrew Russell Forsyth (1900)
"irresoluble FACTORS [109. 109. The discriminant may provide several roots.
If it is an irresoluble function of w, these roots form one set. ..."
6. A new dictionary of the English language by Charles Richardson (1839)
"Bp. Hall appears to mean by irresoluble, —that cannot be freed, released or
relieved, (from guilt or the pangs of guilt ;) that cannot be calmed, quieted, ..."
7. A Treatise on Differential Equations by Andrew Russell Forsyth (1903)
"For the present purpose therefore the equation in p may be considered irresoluble:
if it can be resolved into factors which are not linear and not resoluble ..."
8. Theory of Functions of a Complex Variable by Andrew Russell Forsyth (1893)
"Our purpose, however, is to regard z as the most general form of algebraical
variable and therefore as an irresoluble entity ; so ..."
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