They are "like" terms.
Are term whose variables are the same
These terms are called like terms.For example: x and 2x are like terms.But: x3 and 4x2 are not like termsbecause although the variables are the same, the exponents are different.
Since no terms are added, it is a monomial (one term). Adding the powers of the variables (three variables, each to the first power), you see that it is of degree 3.
The term for that is algebra.
berometer
They are similar terms.
A term must contain a variable, for it to be relevant.
dissimilar terms are terms that do not have the same variable or the variable do not contain the same number of exponents
A like term of 5x is any term that has the same variable raised to the same power. For example, 3x or -2x are like terms of 5x because they both contain the variable x raised to the first power. Like terms can be combined through addition or subtraction, while terms with different variables or powers cannot be combined.
The general name is a "constant".
Are term whose variables are the same
A term with the same variables raised to the same power and all constants is referred to as a "like term." Like terms can be combined by adding or subtracting their coefficients while keeping the variable part unchanged. For example, (3x^2) and (5x^2) are like terms, and their combination would result in (8x^2).
Identical terms are expressions that contain the same variables raised to the same powers and coefficients. For example, in the expression (3xy) and (3xy), both terms are identical because they have the same coefficient (3) and the same variables (x and y) in the same form. Similarly, (5a^2b) and (5a^2b) are identical terms.
They are known as like terms.
Similar terms. These are terms in which the variables have the same power in each term, and only the coefficient changes.
In the expression (7 + 2x), the constant is (7). A constant is a term that does not change and does not contain any variables, while (2x) is a term that depends on the variable (x). Therefore, (7) remains the same regardless of the value of (x).
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