Question

√11 is a polynomial is degree

Answer 1

no its not a polynomial degree....

Answer 2

Concept:

The degree of a polynomial is that the highest power of the variable in a very polynomial expression. As a polynomial is defined as an expression of over two algebraic terms, especially the sum (or difference) of several terms that contain different powers of the identical or different variable(s). it's a linear combination of monomials.

Given:

The given polynomial is $\sqrt{11}.$

Find:

we have to seek out the degree of the polynomial.

Solution:

We have on condition that, Root $11$ could be a polynomial.

The root $11$ are often written as $\sqrt{11}$

Using the zero power identity of exponent, which states that any number to the facility zero is usually capable $1$, i.e.

$\text{(any number)}^{0}=1$

Now, we'll rewrite the given term within the polynomial form, we obtained

$\sqrt{11}=\sqrt{11}\times x^{0}$

As we all know that the variable $x$ has some value and any number to the ability zero is often capable $1.$

Degree of the above polynomial i.e. $\sqrt{11}x^{0}$ is zero.

Hence, the degree of polynomial $\sqrt{11}$ is zero.

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