How to use in-sentence of “polynomial”:
– It says that if the coefficients of a polynomial are integers, then one can find all of the possible rational roots by divisiondividing each factor of the term by each factor of the leading coefficient.
– A rational function is a polynomial divided by a polynomial.
– Another mathematician named Lindeman was also able to show in 1882 that pi was part of the group of numbers known as transcendentals, which are numbers that cannot be the solution to a polynomial equation.
– The parts of a polynomial separated by plus signs are called “terms”, and the signs are themselves part of the term.
– The main objects of study in algebraic geometry are algebraic varietyalgebraic varieties, which are geometric manifestations of sets of solutions of systems of polynomial equations.
– Modified affine arithmetic in tensor form for trivariate polynomial evaluation and algebraic surface plotting.
– Algebraic geometry is a branch of mathematics studying polynomial equations.
– Proven around the year 1800, the fundamental theorem of algebra establishes a link between algebra and geometry by showing that a monic polynomial in one variable with complex coefficients.
Example sentences of “polynomial”:
- If the degree of a polynomial was "n", then the group of the polynomial was the symmetric group on "n" elements.
- The degree of a polynomial is the largest power found in the equation.
- A polynomial equation is an equation where you are only allowed to add and subtract multiples of powers of a variable, like.
– If the degree of a polynomial was “n”, then the group of the polynomial was the symmetric group on “n” elements.
– The degree of a polynomial is the largest power found in the equation.
– A polynomial equation is an equation where you are only allowed to add and subtract multiples of powers of a variable, like.
– Radii polynomial approach for analytic solutions of differential equations: Theory, examples, and comparisons.
– As long as enough values are received correctly, the receiver can deduce what the original polynomial was, and decode the original data.
– It doesn’t mean one can find an answer in the polynomial number of steps, only check it.
– The first definitons of algebraic variety defined it as the set of solutions of a system of polynomial equations, over the real numberreal or complex numbers.
– The population counts for years 1951-2011 were placed in Excel and projected using a 4th order polynomial which fits the data very nicely.
– The polynomial is then “encoded” by its evaluation at various points, and these values are what is actually sent.
– In the same sense that one can correct a curve by interpolating past a gap, a Reed-Solomon code can bridge a series of errors in a block of data to recover the coefficients of the polynomial that drew the original curve.
– It takes t points ot define a polynomial of degree t-1.
– The idea is that a polynomial of degree t-1 is defined by t points on the polynomial: It takes two points to define a straight line, three to define a quadratic curve, four for a cubic, and so on.
– A problem p in NP is also in NPC if and only if every other problem in NP is transformed into p in polynomial time.
– A polynomial with exactly two terms is called a “binomial”.
– If the discriminant is equal to zero, then the polynomial has two repeating real numbers as roots.
– Generalizing this result, Hilbert’s Nullstellensatz provides a fundamental correspondence between ideal ideals of polynomial rings and algebraic sets.
– The polynomial is evaluated at several points, and these values are sent or recorded.