9x5 -- 2x3 -- 8y+ 3
This polynomial has four terms, including a fifth-degree term, a third-degree term, a first-degree term, and a constant term.
This is a fifth-degree polynomial.
4b4 + 9w2 + z
This polynomial has three terms, including a fourth-degree term, a second-degree term, and a first-degree term. There is no constant term.
This is a fourth-degree polynomial.
hint: ^ means to the raised power
i got a little help with this but i hope this is what you were looking for?
2x2y2+5=0 how to solve this
binomial, trinomial, sixth-degree polynomial, monomial.
The degree of a polynomial is the highest degree of its terms.The degree of a term is the sum of the exponents of the variables.7x3y2 + 15xy6 + 23x2y2The degree of the first term is 5.The degree of the second term is 7.The degree of the third term is 4.The degree of the polynomial is 7.
they have variable
The "degree" is only specified for polynomials. The degree of a monomial (a single term) is the sum of the powers of all the variables. For example, x3y2z would have the degree 6; you have to add 3 + 2 + 1 (since z is the same as z to the power 1). The degree of a polynomial is the degree of its highest monomial.
No this is not the case.
Higher
Not into rational factors.
2x2y2+5=0 how to solve this
Usually the sum will have the same degree as the highest degree of the polynomials that are added. However, it is also possible for the highest term to cancel, for example if one polynomial has an x3, and the other a -x3. In this case, the sum will have a lower degree.
The degree of x is 1. Log of x is no part of a polynomial.
put the variable that has the highest degree first.
find the number with the highest exponent, that exponent is the degree. for example, 2x to the 3rd power + 6x to the 2nd power the degree is 3
binomial, trinomial, sixth-degree polynomial, monomial.
W. E. Sewell has written: 'Degree of approximation by polynomials in the complex domain' -- subject(s): Approximation theory, Numerical analysis, Polynomials
The answer depends on whether the equations are second degree polynomials, second degree differential equations or whatever. The methods are very different!
Not quite. The point at infinity cannot be regarded as a maximum since the value will continue to increase asymptotically. As a result no polynomial of odd degree can have a maximum. Only polynomials of an even degree whose leading coefficient is negative will have a global maximum.