yes cause it is just one term
yes- monomial means having one term, 5, 5x and 13xyz are all monomials 2 +13x, and 34xy- 3z are binomials. ( bi means two)
A monomial is an algebraic expression consisting of a single term. In the case of 5xy^2, it is a monomial because it has only one term. The term consists of the coefficient 5, the variable x raised to the power of 1, and the variable y raised to the power of 2. Therefore, 5xy^2 is a monomial.
Yes, it is a monomial.
Since a monomial is a term, any real number is is a monomial.
Monomial.
5x^2(5x + 1)
7x2 - 5x + 4 is not a monomial because it has more than one term. It is a quadratic polynomial.
The degree of a monomial is the sum of the exponents of its variables. In the monomial (-5x^{10}y^{3}), the exponent of (x) is 10 and the exponent of (y) is 3. Adding these together gives (10 + 3 = 13). Therefore, the degree of the monomial (-5x^{10}y^{3}) is 13.
-5x+(3x-8)
35
A monomial had one term.....for example 5x^7 or 342f^9
A like term of the monomial (5x) is any monomial that contains the same variable raised to the same power. For example, (3x), (-2x), and (7x) are all like terms of (5x) because they all have the variable (x) to the first power. Like terms can be combined through addition or subtraction.
A monomial in one variable of degree 4 is an expression that consists of a single term with a variable raised to the fourth power. An example of such a monomial is (5x^4), where 5 is the coefficient and (x) is the variable. The degree of the monomial is determined by the exponent of the variable, which in this case is 4.
yes- monomial means having one term, 5, 5x and 13xyz are all monomials 2 +13x, and 34xy- 3z are binomials. ( bi means two)
Yes. "Monomial" has two definitions: 1. Any number like 1, x, xn, xyz, or xaybzc (with n, a, b, and c positive integers). 2. Anything under definition 1, but including monomials multiplied by a constant, like -5x and (1+2i)xy. Assuming "M" is a variable, "M" is a monomial by either definition. Basically, (by the second definition) a monomial is something that's one of the terms of a polynomial. e.g. in x2 + 5x - 3, x2, 5x, and -3 are monomials, and in x2 + xy + y2, x2, xy, and y2 are monomials.
To find the common monomial factor of a set of monomials, first identify the variables and their corresponding exponents in each monomial. Next, determine the smallest exponent for each variable that appears in all the monomials. Finally, combine the variables with their corresponding smallest exponents to form the common monomial factor. This factor will be the largest monomial that can be factored out from each original monomial.
Monomial. Monomial. Monomial. Monomial.