Option A: z + 1
Option B: 6 + w
Option D: [tex]2 x^{4}-y[/tex]
Solution:
Let us first define the polynomial.
A polynomial can have constants, variables, exponents and fractional coefficients.
A polynomial cannot have negative exponents, fractional exponents and never divided by a variable.
To find which expressions are polynomial:
Option A: z + 1
By the definition, z + 1 is a polynomial.
It is polynomial.
Option B: 6 + w
By the definition, 6 + w is a polynomial.
It is polynomial.
Option C: [tex]y^{2}-\sqrt[3]{y}+4[/tex]
[tex]y^{2}-\sqrt[3]{y}+4=y^{2}-{y}^{1/3}+4[/tex]
Here, y have fractional exponent.
So, it is not a polynomial.
Option D: [tex]2 x^{4}-y[/tex]
By the definition, [tex]2 x^{4}-y[/tex] is a polynomial.
It is polynomial.
Hence z + 1, 6 +w and [tex]2 x^{4}-y[/tex] are polynomials.
