To find the coefficient of the term of degree 1 in the polynomial (5x^2 + 7x^{10} - 4x^4 + 9x^{-2}), we look for the term that includes (x^1). In this polynomial, there is no (x^1) term present, so the coefficient of the term of degree 1 is (0).
The polynomial can be rewritten as (-4x^3 - 45x^2 + 9x). The degree of the polynomial is 3, which is determined by the highest exponent of (x). The leading coefficient, which is the coefficient of the term with the highest degree, is (-4).
The numerical coefficient of it is 2 .
There's no way for me to tell until you show methe polynomial, or at least the term of degree 1 .
The numerical coefficient of the term (4m^2) is 4. The coefficient is the numerical factor that multiplies the variable part of the term, which in this case is (m^2).
Answer thi What is the coefficient of the term of degree 4 in this polynomial?2x5 + 3x4 - x3 + x2 - 12A. 1 B. 2 C. 3 D. 4 s question…
For a single term, the "degree" refers to the power. The coefficient is the number in front of (to the left of) the x.
To find the coefficient of the term of degree 1 in the polynomial (5x^2 + 7x^{10} - 4x^4 + 9x^{-2}), we look for the term that includes (x^1). In this polynomial, there is no (x^1) term present, so the coefficient of the term of degree 1 is (0).
It is the Coefficient. It only refers to the given term that it is front. e.g. 2x^2 - 3x + 1 The '2' in front of 'x^2' only refers to 'x^2'. The '-3' in front of 'x' is the coefficient of '-3' The '1' is a constant.
6
The numerical coefficient of it is 2 .
the coefficient
it is 3. You are doing APEX right?
There's no way for me to tell until you show methe polynomial, or at least the term of degree 1 .
The numerical coefficient of the term (4m^2) is 4. The coefficient is the numerical factor that multiplies the variable part of the term, which in this case is (m^2).
-5a4 The coefficient would be -5. The variable is a and the power is 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.