0
Depends if you like bananas...
JK, no the degree cant be negative because if it was then the trioxians of the neutrino would implode to a sub zero quantum ordinate and the multiverse would incenerate itself and turn into a meca black hole...and that is why we dont want monomials to have a negative degree.
What else can I help you with?
If the degree of a term is negative the term is still a monomial?
false
What is the degree of 18 monomial?
It is Eighteen
Can a negative number be a monomial?
Since a negative number is a term, it is a monomial.
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
If the degree of a term is negative the term is still a monomial?
false
What is the degree of 18 monomial?
It is Eighteen
What is the degree of the monomial -2?
The monomial -2 has a degree of 0.
Can a negative number be a monomial?
Since a negative number is a term, it is a monomial.
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
Can a monomial have a negative number?
Yes.
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 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.
