Add(RealRationalPolynomial lhs, RealRationalPolynomial rhs)
{
/* nL nR
* p^2+2p+2 p^2+5p+6
* ───────── + ────────
* p^2+ p+1 p^2+3p+4
* dL dR
*
* dL dR
* 分母 = (p^2+p+1) (p^2+3p+4)
* 分母の次数 = degree(dL) + degree(dR) + 1
*
* nL dR nR dL
* 分子 = (p^2+2p+2)(p^2+3p+4) + (p^2+5p+4)(p^2+p+1)
* 分子の次数 = degree(nL) + degree(dR) + 1 か degree(nR) * degree(dL) + 1の大きいほう
*/
var denomL = lhs.DenomPolynomial();
var numerL = lhs.NumerPolynomial();
var denomR = rhs.DenomPolynomial();
var numerR = rhs.NumerPolynomial();
// 分母の項
var denom = Mul(denomL, denomR);
// 分子の項
var numer = Add(Mul(numerL, denomR), Mul(numerR, denomL));
return(new RealRationalPolynomial(numer, denom));
}
Mul(RealRationalPolynomial lhs, RealRationalPolynomial rhs)
{
var nl = lhs.NumerPolynomial();
var nr = rhs.NumerPolynomial();
var n = Mul(nl, nr);
var dl = lhs.DenomPolynomial();
var dr = rhs.DenomPolynomial();
var d = Mul(dl, dr);
return(new RealRationalPolynomial(n.Coeffs(), d.Coeffs()));
}
public RealRationalPolynomial(RealRationalPolynomial from) :
this(from.NumerCoeffs(), from.DenomCoeffs())
{
}
