AdaptableBinaryFunction providing an integral division.
Integral division (a.k.a. exact division or division without remainder) maps ring elements (x,y) to ring element z such that x = yz if such a z exists (i.e. if x is divisible by y). Otherwise the effect of invoking this operation is undefined. Since the ring represented is an integral domain, z is uniquely defined if it exists.
AdaptableBinaryFunction
AlgebraicStructureTraits::IntegralDivision::result_type | |
Is AlgebraicStructureTraits::Type.
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AlgebraicStructureTraits::IntegralDivision::first_argument | |
Is AlgebraicStructureTraits::Type.
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AlgebraicStructureTraits::IntegralDivision::second_argument | |
Is AlgebraicStructureTraits::Type.
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result_type | integral_division ( first_argument_type x , second_argument_type y ) | |
returns x/y, this is an integral division. | ||
template <class NT1, class NT2> | ||
result_type | integral_division ( NT1 x , NT2 y ) | |
This operator is defined if NT1 and NT2 are ExplicitInteroperable with coercion type AlgebraicStructureTraits::Type. |
AlgebraicStructureTraits
AlgebraicStructureTraits::Divides