Let f and g be functions. (a) The function ( f + g ) ( x ) is defined for all values of x that are in the domains of both _______ and_______. (b) The function ( f g ) ( x ) is defined for ail values of x that are in the domains of both ________ and_________ . (c) The function ( f / g ) ( x ) is defined for all values of x that are in the domains of both ________and________, and g ( x ) is not equal to ________.
Let f and g be functions. (a) The function ( f + g ) ( x ) is defined for all values of x that are in the domains of both _______ and_______. (b) The function ( f g ) ( x ) is defined for ail values of x that are in the domains of both ________ and_________ . (c) The function ( f / g ) ( x ) is defined for all values of x that are in the domains of both ________and________, and g ( x ) is not equal to ________.
Solution Summary: The author explains how the function (f+g) is defined for all values in the domains of both f and g.
(a) The function
(
f
+
g
)
(
x
)
is defined for all values of
x
that are in the domains of both _______ and_______.
(b) The function
(
f
g
)
(
x
)
is defined for ail values of
x
that are in the domains of both ________ and_________ .
(c) The function
(
f
/
g
)
(
x
)
is defined for all values of
x
that are in the domains of both ________and________, and
g
(
x
)
is not equal to ________.
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