They are like terms.
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 degree is equal to the highest exponent on a variable, which is 2.
The term coefficient refers to a number that is next to a variable. For example in the term 4x2, 4 is a coefficient, and 2 is an exponent; x is a variable.
If you divide two common bases, you can subtract their exponents as an equivalent operation.
the exponent is a negative
the variable's exponent
For a term with one variable, the degree is the variable's exponent. With more than one variable, the degree is the sum of the exponents of the variables. This means a linear term has degree 1 and a constant has degree 0.
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.
9b2b is the base.==========9 is the coefficient of the variable term.2 is the exponent.
The degree is equal to the highest exponent on a variable, which is 2.
The term coefficient refers to a number that is next to a variable. For example in the term 4x2, 4 is a coefficient, and 2 is an exponent; x is a variable.
It depends on the power to which the single variable is raised in that one term.
If you divide two common bases, you can subtract their exponents as an equivalent operation.
Monomials can have negative exponents, if the term for the exponent is not a variable, but if it is a variable with a negative exponent, the whole expression will not be classified. This is so because the definition of a monomial states that, a monomial can be a product of a number and one or more variables with positive integer exponents. I hope that answered your question!
The LCM will contain all factors including variables. Look at coefficients and find their LCM. Then IF several terms have a common factor with a differnt exponent, use that variable with the largest exponent. If a variable appears in only one term, it will still be part of the LCM with its exponent. EX Find LCM for 14s3 and 6 ---- ANSWER --- 42s3 Ex Find Lcm for 3x2y , 4y3, and 7x --- The LCM is 84x2y3 biggest exponents even if not in all terms.
the exponent is a negative
They are known as like terms.