In my opinion the question is poorly defined, since "non-polynomial" could be just about anything.
"Non-polynomials" may be just about anything; how alike or different they are will depend on what specific restrictions you put on such functions, or whether you are even talking about functions.
what is non polynomials
Yes, polynomials are a closed set under addition. This means that if you take any two polynomials and add them together, the result will also be a polynomial. The sum of two polynomials retains the structure of a polynomial, as it still consists of terms with non-negative integer exponents and real (or complex) coefficients.
"Non-polynomial" can mean just about anything... How alike it is with the polynomial depends on what specifically you choose to include.
Yes, polynomials are closed under the operations of addition, subtraction, and multiplication. This means that when you add, subtract, or multiply two polynomials, the result is always another polynomial. For example, if ( p(x) ) and ( q(x) ) are polynomials, then ( p(x) + q(x) ), ( p(x) - q(x) ), and ( p(x) \cdot q(x) ) are all polynomials as well. However, polynomials are not closed under division, as dividing one polynomial by another can result in a non-polynomial expression.
how alike the polynomial and non polynomial
they have variable
A "non-polynomial" can be just about anything; how alike they are depends what function (or non-function) you specifically have in mind.
A "non-polynomial" can be just about anything; how alike they are depends what function (or non-function) you specifically have in mind.
"Non-polynomials" may be just about anything; how alike or different they are will depend on what specific restrictions you put on such functions, or whether you are even talking about functions.
"Non-polynomials" may be just about anything; how alike or different they are will depend on what specific restrictions you put on such functions, or whether you are even talking about functions.
what is non polynomials
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
How are western and non western childbirth alike and different
How are western and non western childbirth alike and different
Other polynomials of the same, or lower, order.