例句與造句

1. A third bound also due to Lagrange holds for a polynomial with real coefficients.
2. This includes polynomials with real coefficients, since every real number is a complex number with an imaginary part equal to zero.
3. A cubic polynomial with real coefficients can either have three real roots, or one real root and two complex conjugate roots.
4. This theorem concerns the formulas of the first-order logic whose atomic formulas are polynomial equalities or inequalities between polynomials with real coefficients.
5. When applying these methods to polynomials with real coefficients and real starting points, Newton's and Halley's method stay inside the real number line.
6. It's difficult to find polynomial with real coefficients in a sentence. 用polynomial with real coefficients造句挺難的
7. Since nonreal roots of a polynomial with real coefficients must occur in conjugate pairs, we can see that has exactly 2 nonreal roots and 1 real ( and positive ) root.
8. In case of a real variety ( that is the set of the points with real coordinates of a variety defined by polynomials with real coefficients ), the variety is a manifold near every regular point.
9. As will be mentioned again below, it follows from the fundamental theorem of algebra that every non-constant polynomial with real coefficients can be written as a product of polynomials with real coefficients whose degree is either 1 or 2.
10. As will be mentioned again below, it follows from the fundamental theorem of algebra that every non-constant polynomial with real coefficients can be written as a product of polynomials with real coefficients whose degree is either 1 or 2.
11. The non-real roots of a real polynomial with real coefficients can be grouped into pairs of complex conjugates, namely with the two members of each pair having imaginary parts that differ only in sign and the same real part.
12. The "'Lindsey Fox algorithm "', named after Pat Lindsey and Jim Fox, is a numerical algorithm for finding the roots or zeros of a high-degree polynomial with real coefficients over the complex field.
13. For an algebraic set defined over the reals ( that is defined by polynomials with real coefficients ), it may occur that the real dimension of the set of its real points is smaller than its dimension as a semi algebraic set.
14. In basic treatments it is desirable to have the coefficients of the factors be of the same type as the coefficients of the original polynomial, that is factoring polynomials with integer coefficients into factors with integer coefficients, or factoring polynomials with real coefficients into polynomials with real coefficients.
15. In basic treatments it is desirable to have the coefficients of the factors be of the same type as the coefficients of the original polynomial, that is factoring polynomials with integer coefficients into factors with integer coefficients, or factoring polynomials with real coefficients into polynomials with real coefficients.
16. The power series expression for the square root on the eigenspace show that the principal square root of has the form " q " ( " A " ) where " q " ( " t " ) is a polynomial with real coefficients.
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