Respuesta :

For a logarithmic function, we have a restriction on the domain.
Since log(0) isn't defined, we say that there is an asymptote at x = 0.
Thus, for the regular logarithmic function y = log(x), x > 0.

We can then say (x + 4) > 0, since that's when the function of a logarithm is defined as.
x + 4 > 0
x > -4

Thus, the domain of the logarithmic function is x > -4, where x is a real integer.
mjankiewicz
The logaritm of b base a

[tex]log_ab[/tex]

Conditions for the base a: [tex]a>0 \ and \ a\ne 1[/tex] 
Conditions for the number b: [tex]b>0[/tex]

[tex]b=x+4\\\\ x+4>0 \Rightarrow x>-4[/tex]

Answer
[tex]D: \ x\in (-4;\infty)[/tex] 

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