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1 Children: abs - conjugate Parents: abs - mglyph abs a and annotation annotation-xml apply approx arccos arccosh arccot arccoth arccsc arccsch arcsec arcsech arcsin arcsinh arctan arctanh arg bvar b card c cartesianproduct ceiling ci cn codomain complexes compose condition conjugate
2 Children: cos - gcd Parents: abs - mglyph cos c cosh cot coth csc csch csymbol curl declare d degree determinant diff divergence divide domain domainofapplication emptyset e eq equivalent eulergamma exists exp exponentiale factorial f factorof false floor fn forall gcd g
3 Children: geq - math Parents: abs - mglyph geq g grad gt ident i image imaginary imaginaryi implies in infinity int integers intersect interval inverse lambda l laplacian lcm leq limit list ln log logbase lowlimit lt maction m maligngroup malignmark math
4 Children: matrix - mstyle Parents: abs - mglyph matrix m matrixrow max mean median menclose merror mfenced mfrac mglyph mi min minus mlabeledtr mmultiscripts mn mo mode moment momentabout mover mpadded mphantom mprescripts mroot mrow ms mspace msqrt mstyle
5 Children: msub - quotient Parents: abs - mglyph msub m msubsup msup mtable mtd mtext mtr munder munderover naturalnumbers n neq none not notanumber notin notprsubset notsubset or o otherwise outerproduct partialdiff p pi piece piecewise plus power primes product prsubset quotient q
6 Children: rationals - vectorproduct Parents: abs - mglyph rationals r real reals reln rem root scalarproduct s sdev sec sech selector semantics sep set setdiff sin sinh subset sum tan t tanh tendsto times transpose true union u uplimit variance v vector vectorproduct
7 Children: xor - xor Parents: abs - mglyph xor x
8 Children: abs - conjugate Parents: mi - xor abs a and annotation annotation-xml apply approx arccos arccosh arccot arccoth arccsc arccsch arcsec arcsech arcsin arcsinh arctan arctanh arg bvar b card c cartesianproduct ceiling ci cn codomain complexes compose condition conjugate
9 Children: cos - gcd Parents: mi - xor cos c cosh cot coth csc csch csymbol curl declare d degree determinant diff divergence divide domain domainofapplication emptyset e eq equivalent eulergamma exists exp exponentiale factorial f factorof false floor fn forall gcd g
10 Children: geq - math Parents: mi - xor geq g grad gt ident i image imaginary imaginaryi implies in infinity int integers intersect interval inverse lambda l laplacian lcm leq limit list ln log logbase lowlimit lt maction m maligngroup malignmark math
11 Children: matrix - mstyle Parents: mi - xor matrix m matrixrow max mean median menclose merror mfenced mfrac mglyph mi min minus mlabeledtr mmultiscripts mn mo mode moment momentabout mover mpadded mphantom mprescripts mroot mrow ms mspace msqrt mstyle
12 Children: msub - quotient Parents: mi - xor msub m msubsup msup mtable mtd mtext mtr munder munderover naturalnumbers n neq none not notanumber notin notprsubset notsubset or o otherwise outerproduct partialdiff p pi piece piecewise plus power primes product prsubset quotient q
13 Children: rationals - vectorproduct Parents: mi - xor rationals r real reals reln rem root scalarproduct s sdev sec sech selector semantics sep set setdiff sin sinh subset sum tan t tanh tendsto times transpose true union u uplimit variance v vector vectorproduct
14 Children: xor - xor Parents: mi - xor xor x
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