5_1 IntroPolynomials
... Leaving space for missing terms will help you when you start adding & subtracting polynomials ...
... Leaving space for missing terms will help you when you start adding & subtracting polynomials ...
Why division as “repeated subtraction” works
... Find a number that, when added to √7, yields an integer. Find a number that, when multiplied 7,√yields an integer. Find a number that, when added to 2 + √7, yields an integer. Find a number that, when multiplied 2 + 7, yields an integer. Find√as many different numbers as possible that, when added to ...
... Find a number that, when added to √7, yields an integer. Find a number that, when multiplied 7,√yields an integer. Find a number that, when added to 2 + √7, yields an integer. Find a number that, when multiplied 2 + 7, yields an integer. Find√as many different numbers as possible that, when added to ...
enumerating polynomials over finite fields
... We apply enumeration of unlabelled objects to something seemingly less combinatorial: polynomials over finite fields. A polynomial is irreducible if it is of positive degree and cannot be factored into polynomials of strictly smaller degree. So for instance every polynomial of degree one is irreduci ...
... We apply enumeration of unlabelled objects to something seemingly less combinatorial: polynomials over finite fields. A polynomial is irreducible if it is of positive degree and cannot be factored into polynomials of strictly smaller degree. So for instance every polynomial of degree one is irreduci ...
