classifacation of algebraic expression according to the number of terms
the degree of polynomial is determined by the highest exponent its variable has.
No. For example all polynomials of the form y=xn (or sums of such positive terms) where n is a positive odd number do not have a minimum.
3
Add together the coefficients of "like" terms. Like terms are those that have the same powers of the variables in the polynomials.
classifacation of algebraic expression according to the number of terms
the degree of polynomial is determined by the highest exponent its variable has.
Hellllp meee, how do you add polynomials when you don't have any like terms is a very common questions when it comes to this type of math. However, the polynomials can only be added if all terms are alike. No unlike terms can be added within the polynomials.
No. For example all polynomials of the form y=xn (or sums of such positive terms) where n is a positive odd number do not have a minimum.
3
Adding and subtracting polynomials is simply the adding and subtracting of their like terms.
Add together the coefficients of "like" terms. Like terms are those that have the same powers of the variables in the polynomials.
You just multiply the term to the polynomials and you combine lije terms
can be classified by the number of terms 1 term .... monomial 2 .... binomial 3 .... trinomial 4 or more ... polynomial Also by exponents if only 1 variable and largest exponent is 2, then it is a quadratic if 1 variable and largest exp. is 3, then a cubic.
descending
To add polynomials , simply combine similar terms. Combine similar terms get the sum of the numerical coefficients and affix the same literal coefficient .
Polynomials can be classified based on the number of terms they contain. A polynomial with one term is called a monomial, such as 5x or -2y^2. A polynomial with two terms is called a binomial, like 3x + 2 or 4y - 7. A polynomial with three terms is called a trinomial, for example, 2x^2 + 5x - 3. Polynomials with more than three terms are simply referred to as polynomials.