Determine if the expression the square root of "r"
is a polynomial or not. If it is a polynomial, state the type and degree of the polynomial.
the given expression "represents" or "doesn't represent" a polynomial
pls help ;-; tysm
(if u have the rest of the sample work on delta math add those too :(
NVM
polynomials have non-negative integer exponents.
So, no.
try reading about them.
To determine if the expression √r is a polynomial, we need to understand what a polynomial is.
A polynomial is an algebraic expression that consists of coefficients, variables, and exponents. The exponents must be whole numbers, and the variables cannot appear in denominators or inside square roots, radicals, or absolute values.
In the given expression, √r, we can see that the variable, r, is inside the square root symbol. Therefore, the expression does not represent a polynomial.
Polynomials can be classified based on the number of terms they have, and the degree of the terms. Here are some common types of polynomials:
1. Constant Polynomial: It has only one term with a constant coefficient, e.g., p(x) = 3.
2. Linear Polynomial: It has one term of degree 1, e.g., p(x) = 2x.
3. Quadratic Polynomial: It has one term of degree 2, e.g., p(x) = 4x^2 - 3x + 1.
4. Cubic Polynomial: It has one term of degree 3, e.g., p(x) = x^3 + 2x^2 - 5.
5. Higher Degree Polynomials: They have terms of degree greater than 3.
Since √r is not a polynomial, we cannot determine its type or degree.
Regarding your request for sample work on delta math, unfortunately, as an AI text-based assistant, I don't have access to specific tasks or problems from specific platforms. However, I'm here to help you understand concepts, guide you through problem-solving strategies, and provide explanations to any questions you may have. Please feel free to ask anything else you need assistance with!