What is the degree of the zero polynomial

In zero polynomial the variables having coefficients have a value equal to zero. As a result, a zero polynomial has no value. The function which defines the same is referred to as zero maps or a constant function, and it is commonly written: P(x) = 0, with x being the terms’ variable with zero coefficient. 

The x-axis is the graph of the zero polynomial function, which is defined as below:

y = P(x) = 0

Real numbers are used in the domain, and the range is set to zero. The set of x values for which the function is defined is the domain, while the range is the set of y values upon which the function is dependent.

Until a degree is assigned, the degree of a zero polynomial is normally indeterminate, in which case it is -1 or infinity. 

If f(x) = a as f(x) = ax⁰ 

where a ≠ 0, any non-zero number or constant is a zero degree polynomial. 

F(x) = 0, g(x) = 0x, and h(x) = 0x² are some examples.

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