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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.
- a one-term polynomial, such as 6x or 3x^2, may also be called a "monomial" ("mono" meaning "one")
- a two-term polynomial, such as 2x + f or 4x2 -- 7, may also be called a "binomial" ("bi" meaning "two")
- a three-term polynomial, such as 5x + h + s or x4 + 7d2 -- 4, may also be called a "trinomial" ("tri" meaning "three")
hint: ^ means to the raised power
i got a little help with this but i hope this is what you were looking for?
What else can I help you with?
Degree of polynomials?
2x2y2+5=0 how to solve this
What are three types of polynomials?
binomial, trinomial, sixth-degree polynomial, monomial.
How can you get the degree of the polynomials?
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.
How polynomials and non polynomials are alike?
they have variable
What is the degree an algebraic ezpression?
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.
Are the Lagrangian polynomials of degree n is orthogonal to the polynomials of degree less than n?
No this is not the case.
Finding roots by graphing not only works for quadratic that is second-degree polynomials but polynomials of degree as well?
Higher
Can all cubic polynomials be factored into polynomials of degree 1 or 2?
Not into rational factors.
Degree of polynomials?
2x2y2+5=0 how to solve this
How is the degree of of the sum related to the degree of the original polynomials?
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.
In the study of polynomials what is the degree of x and the log of x?
The degree of x is 1. Log of x is no part of a polynomial.
What is the correct order in which polynomials be always written?
put the variable that has the highest degree first.
How do you state the degree of a polynomials?
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
What are three types of polynomials?
binomial, trinomial, sixth-degree polynomial, monomial.
What has the author W E Sewell written?
W. E. Sewell has written: 'Degree of approximation by polynomials in the complex domain' -- subject(s): Approximation theory, Numerical analysis, Polynomials
What is the best way to solve second degree equations?
The answer depends on whether the equations are second degree polynomials, second degree differential equations or whatever. The methods are very different!
How do you classify polynomials based on degree?
Oh, dude, it's like super simple. So, basically, you classify polynomials based on their degree, which is the highest power of the variable in the polynomial. If the highest power is 1, it's a linear polynomial; if it's 2, it's quadratic; and if it's 3, it's cubic. Anything beyond that, like a fourth-degree polynomial or higher, we just call them "higher-degree polynomials." Easy peasy, lemon squeezy!
