It is: 5
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).
In the expression (4 + 5n), the coefficient is the number that is multiplied by the variable (n). Here, the coefficient of (n) is 5. The constant term in the expression is 4, but it does not have a variable associated with it. Thus, the coefficient of (n) is 5.
An algebraic expression. 4 = the constant and coefficient term. d = the variable term.
The coefficient of the expression ( 4 \times 450 ) is 4. In this context, the coefficient refers to the numerical factor that multiplies the variable or term—in this case, the number 4 is the coefficient of the product. The overall product equals 1800, but the coefficient remains 4.
In the expression (12a^3 + 16a + 4), the coefficients are the numerical factors that multiply each term. The coefficient of (a^3) is 12, the coefficient of (a) is 16, and the constant term (which can be considered as (a^0)) has a coefficient of 4. Therefore, the coefficients are 12, 16, and 4.
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).
In the expression (4 + 5n), the coefficient is the number that is multiplied by the variable (n). Here, the coefficient of (n) is 5. The constant term in the expression is 4, but it does not have a variable associated with it. Thus, the coefficient of (n) is 5.
An algebraic expression. 4 = the constant and coefficient term. d = the variable term.
The coefficient of the expression ( 4 \times 450 ) is 4. In this context, the coefficient refers to the numerical factor that multiplies the variable or term—in this case, the number 4 is the coefficient of the product. The overall product equals 1800, but the coefficient remains 4.
In the expression (12a^3 + 16a + 4), the coefficients are the numerical factors that multiply each term. The coefficient of (a^3) is 12, the coefficient of (a) is 16, and the constant term (which can be considered as (a^0)) has a coefficient of 4. Therefore, the coefficients are 12, 16, and 4.
The numerical coefficient of it is 2 .
The coefficient term of degree 4 in a polynomial is the constant that multiplies the (x^4) term. For example, in the polynomial (3x^4 + 2x^3 - x + 5), the coefficient of degree 4 is 3. If there is no (x^4) term present, the coefficient is considered to be 0.
The coefficient in math basically means the number that is placed right next to a variable. An example can be in 3x+4. The numerical coefficient would be 3.
the coefficient
5n+4=0 5n=-4 n= -4/5
33
It is 5n-4 and so the next term will be 21