例句與造句

1. Polynomial long division is thus an algorithm for Euclidean division.
2. The quotient and the remainder are found using the polynomial long division.
3. :Well, do you know about Polynomial long division?
4. However, some algorithms, such as polynomial long division require a specific order of the terms.
5. Although polynomial long division is more difficult than evaluating the function itself, synthetic division is computationally easier.
6. It's difficult to find polynomial long division in a sentence. 用polynomial long division造句挺難的
7. By hand as well as with a computer, this division can be computed by the polynomial long division algorithm.
8. See Polynomial long division, Polynomial greatest common divisor # Euclidean division and Polynomial greatest common divisor # Pseudo-remainder sequences.
9. As with polynomials of variables, a polynomial in the lag operator can be divided by another one using polynomial long division.
10. All possible combinations of integer factors can be tested for validity, and each valid one can be factored out using polynomial long division.
11. The first two conditions are satisfied simply by the definition of " g ", while the third condition can be proved using polynomial long division.
12. The other factor in such a factorization of " p " ( " x " ) can be obtained by polynomial long division or synthetic division.
13. This polynomial becomes the divisor in a polynomial long division, which takes the message as the dividend and in which the quotient is discarded and the remainder becomes the result.
14. where and are the remainder and the quotient of the polynomial long division of by, and where is the minimal number of polynomial divisions ( never greater than ) needed to obtain a zero remainder.
15. Note that even in the reducible case in which one of three real roots is rational and hence can be factored out by polynomial long division, Cardano's formula ( unnecessarily in this case ) expresses that root ( and the others ) in terms of non-real radicals.
16. Now, apply polynomial long division to divide z ^ 4 + z ^ 2-2z + 6 by z ^ 2-2z + 2; this will allow you to determine other irreducible polynomial factors of z ^ 4 + z ^ 2-2z + 6, and therefore other roots of z ^ 4 + z ^ 2-2z + 6.
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