LaTeX to CAS translator
This mockup demonstrates the concept of TeX to Computer Algebra System (CAS) conversion.
The demo-application converts LaTeX functions which directly translate to CAS counterparts.
Functions without explicit CAS support are available for translation via a DRMF package (under development).
The following LaTeX input ...
{\displaystyle \frac{1}{(-x,-qx^{-1};q)_\infty}}
... is translated to the CAS output ...
Semantic latex: \frac{1}{(-x,-qx^{-1};q)_\infty}
Confidence: 0
Mathematica
Translation: Divide[1,Subscript[- x , - q*(x)^(- 1); q, Infinity]]
Information
Sub Equations
- Divide[1,Subscript[- x , - q*(x)^(- 1); q, Infinity]]
Free variables
- q
- x
Tests
Symbolic
Numeric
SymPy
Translation: (1)/(Symbol('{- x , - q*(x)**(- 1); q}_{oo}'))
Information
Sub Equations
- (1)/(Symbol('{- x , - q*(x)**(- 1); q}_{oo}'))
Free variables
- q
- x
Tests
Symbolic
Numeric
Maple
Translation: (1)/(- x , - q*(x)^(- 1); q[infinity])
Information
Sub Equations
- (1)/(- x , - q*(x)^(- 1); q[infinity])
Free variables
- q
- x
Tests
Symbolic
Numeric
Dependency Graph Information
Description
- example of such weight function
Complete translation information:
{
"id" : "FORMULA_30310e799ee1611493ef2a876e218c34",
"formula" : "\\frac{1}{(-x,-qx^{-1};q)_\\infty}",
"semanticFormula" : "\\frac{1}{(-x,-qx^{-1};q)_\\infty}",
"confidence" : 0.0,
"translations" : {
"Mathematica" : {
"translation" : "Divide[1,Subscript[- x , - q*(x)^(- 1); q, Infinity]]",
"translationInformation" : {
"subEquations" : [ "Divide[1,Subscript[- x , - q*(x)^(- 1); q, Infinity]]" ],
"freeVariables" : [ "q", "x" ]
},
"numericResults" : {
"overallResult" : "SKIPPED",
"numberOfTests" : 0,
"numberOfFailedTests" : 0,
"numberOfSuccessfulTests" : 0,
"numberOfSkippedTests" : 0,
"numberOfErrorTests" : 0,
"wasAborted" : false,
"crashed" : false,
"testCalculationsGroups" : [ ]
},
"symbolicResults" : {
"overallResult" : "SKIPPED",
"numberOfTests" : 0,
"numberOfFailedTests" : 0,
"numberOfSuccessfulTests" : 0,
"numberOfSkippedTests" : 0,
"numberOfErrorTests" : 0,
"crashed" : false,
"testCalculationsGroup" : [ ]
}
},
"SymPy" : {
"translation" : "(1)/(Symbol('{- x , - q*(x)**(- 1); q}_{oo}'))",
"translationInformation" : {
"subEquations" : [ "(1)/(Symbol('{- x , - q*(x)**(- 1); q}_{oo}'))" ],
"freeVariables" : [ "q", "x" ]
},
"numericResults" : {
"overallResult" : "SKIPPED",
"numberOfTests" : 0,
"numberOfFailedTests" : 0,
"numberOfSuccessfulTests" : 0,
"numberOfSkippedTests" : 0,
"numberOfErrorTests" : 0,
"wasAborted" : false,
"crashed" : false,
"testCalculationsGroups" : [ ]
},
"symbolicResults" : {
"overallResult" : "SKIPPED",
"numberOfTests" : 0,
"numberOfFailedTests" : 0,
"numberOfSuccessfulTests" : 0,
"numberOfSkippedTests" : 0,
"numberOfErrorTests" : 0,
"crashed" : false,
"testCalculationsGroup" : [ ]
}
},
"Maple" : {
"translation" : "(1)/(- x , - q*(x)^(- 1); q[infinity])",
"translationInformation" : {
"subEquations" : [ "(1)/(- x , - q*(x)^(- 1); q[infinity])" ],
"freeVariables" : [ "q", "x" ]
},
"numericResults" : {
"overallResult" : "SKIPPED",
"numberOfTests" : 0,
"numberOfFailedTests" : 0,
"numberOfSuccessfulTests" : 0,
"numberOfSkippedTests" : 0,
"numberOfErrorTests" : 0,
"wasAborted" : false,
"crashed" : false,
"testCalculationsGroups" : [ ]
},
"symbolicResults" : {
"overallResult" : "SKIPPED",
"numberOfTests" : 0,
"numberOfFailedTests" : 0,
"numberOfSuccessfulTests" : 0,
"numberOfSkippedTests" : 0,
"numberOfErrorTests" : 0,
"crashed" : false,
"testCalculationsGroup" : [ ]
}
}
},
"positions" : [ {
"section" : 2,
"sentence" : 1,
"word" : 7
} ],
"includes" : [ ],
"isPartOf" : [ ],
"definiens" : [ {
"definition" : "example of such weight function",
"score" : 0.7125985104912714
} ]
}