Yes because there is only one number
Monomial. Monomial. Monomial. Monomial.
The degree of a monomial is the sum of the exponents of its variables. For example, in the monomial (3x^2y^3), the degree is (2 + 3 = 5). If a monomial has no variables, such as the constant (7), its degree is considered to be (0).
2•2•2•2•x
A monomial is an algebraic expression with only one term. One example of a monomial is 4x. Other examples are 4x^2 or 8/y
A monomial is an expression made up of a co-efficient, a variable , and an exponent that has only one term. Monomial = 4x ^2 4= co-efficient x=variable 2= exponent.
The monomial -2 has a degree of 0.
4
no
Monomial. Monomial. Monomial. Monomial.
No. As soon as you have an addition or a subtraction, you have more than one monomial (in this case, 2 of them).
The degree of a monomial is the sum of the exponents of its variables. For example, in the monomial (3x^2y^3), the degree is (2 + 3 = 5). If a monomial has no variables, such as the constant (7), its degree is considered to be (0).
2•2•2•2•x
5
A monomial is an algebraic expression with only one term. One example of a monomial is 4x. Other examples are 4x^2 or 8/y
A monomial is an expression made up of a co-efficient, a variable , and an exponent that has only one term. Monomial = 4x ^2 4= co-efficient x=variable 2= exponent.
To divide a monomial by another monomial, you divide the coefficients (numerical parts) and subtract the exponents of the same base variables. For example, when dividing ( \frac{6x^4}{2x^2} ), you would divide the coefficients ( 6 \div 2 = 3 ) and subtract the exponents of ( x ) as ( 4 - 2 = 2 ). Thus, the result is ( 3x^2 ).
No. As soon as you have an addition or a subtraction, you have more than one monomial (in this case, 2 of them).