How does the domain of a function relate to its x-values?

1 Answer
Bernardo Russo G. Ferreira
Nov 20, 2014

The Domain of a function is exactly the set of values that the #x# can equal.
If the Domain of a #f(x)# is #D_(f) = RR#, to every #x# in #RR#, #f(x)# is defined.
If the Domain of a #g(x)# is #D_(g) = RR - {a}#, #g(x)# is only defined if #x!=a#.

The function #f(x) = 1/x#, is not defined for #x = 0#, hence it's Domain equals #D_(f) = RR - {0}#.

The function #g(x)=ln(x)#, is not defined for #x<=0#, hence, it's Domain equals #D_(g) = {x in RR | x>0}#//

Hope it helps

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