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What is the degree of 18 monomial?
It is Eighteen
How do you find the degree of a monomial?
By definition, a monomial has only one unknown independent variable, usually represented by a letter of the alphabet. The exponent immediately after that symbol for the unknown is the degree of the monomial.
What is the degree of this monomial -5x10y3?
10
What is the degree monomial of -5x10y3?
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.
What is the monomial in one variable of degree 4?
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.
What is the degree of the monomial -2?
The monomial -2 has a degree of 0.
What is the degree of 18 monomial?
It is Eighteen
What is the degree of momomial -7x4?
The degree of a monomial is determined by the exponent of its variable. In the case of the monomial (-7x^4), the exponent of (x) is 4. Therefore, the degree of the monomial (-7x^4) is 4.
How do you find the degree of a monomial?
By definition, a monomial has only one unknown independent variable, usually represented by a letter of the alphabet. The exponent immediately after that symbol for the unknown is the degree of the monomial.
What is the degree of this monomial 7abcde?
5 is the answer (:
What is the degree of this monomial -5x10y3?
10
What is the sum of the exponents of the variables of a monomial is the of the monomial?
The degree of a term is the sum of the exponents on the variables.
What is the monomial in one variable of degree 4?
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.
What is the degree monomial of -5x10y3?
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.
The degree of a monomial is determined by the sum of the?
constant
Enter the degree of the following monomial.?
4xyz
What is the degree of the term 4x2y?
4x2y The degree of the monomial is 2.
