"Polynomial" Example Sentences
1. The polynomial equation was difficult to solve.
2. The degree of the polynomial was quite high.
3. The roots of the polynomial had complex values.
4. The polynomial function had multiple local extrema.
5. The polynomial regression model fit the data well.
6. The polynomial time complexity of the algorithm made it inefficient.
7. The coefficients of the polynomial were irrational numbers.
8. The polynomial was factorizable into quadratic expressions.
9. The derivative of the polynomial was a simpler function.
10. The integral of the polynomial function had no closed form.
11. The polynomial had a leading term with a negative coefficient.
12. The polynomial division algorithm helped simplify the expression.
13. The polynomial had a double root at the origin.
14. The polynomial was irreducible over the field of real numbers.
15. The coefficients of the polynomial were determined by the data points.
16. The polynomial expression had terms of different degrees.
17. The polynomial had a local maximum at x = -3.
18. The polynomial was orthogonal to another given function.
19. The polynomial was a Chebyshev polynomial of the first kind.
20. The polynomial had a positive leading coefficient.
21. The zeros of the polynomial were all real numbers.
22. The polynomial was symmetric about the y-axis.
23. The polynomial degree was reduced by using synthetic division.
24. The polynomial had a local minimum at x = 5.
25. The roots of the polynomial formed a geometric sequence.
26. The polynomial interpolation produced a smooth curve.
27. The polynomial regression performed better than linear regression.
28. The polynomial had odd degree and a negative leading coefficient.
29. The coefficients of the polynomial were determined by a least squares fit.
30. The polynomial was used to approximate a non-polynomial function.
Common Phases
1. Solving
polynomials;
2. Factoring
polynomials;
3. Degree of a
polynomial;
4. Leading coefficient of a
polynomial;
5. Simplifying
polynomials;
6. Long division of
polynomials;
7. Synthetic division of
polynomials;
8. Graphing
polynomial functions;
9. Rational zeros theorem for
polynomials;
10. Descartes' rule of signs for
polynomials;
11. Newton's method for finding roots of
polynomials;
12. Lagrange's interpolation
polynomial;
13. Chebyshev
polynomials;
14. Orthogonal
polynomials.