To find the domain of the real-valued function
f(x)=‌+√4−9x2, we analyze the conditions under which each part of the function is defined.
First Part: ‌For the square root in the denominator to be defined and non-zero, the expression inside must be positive:
log0.5(2x−3)>0.
The base of the logarithm is less than 1 . This means:
2x−3<1‌‌⇒‌‌x<2Additionally, the expression inside the logarithm must be positive:
2x−3>0‌‌⇒‌‌x>‌Second Part: √4−9x2The expression under the square root must be non-negative:
4−9x2>0‌‌⇒‌‌x2<‌Solving for
x, we derive:
−‌<x<‌Intersection of Conditions:From the first part, we need
x to satisfy both conditions:
‌<x<2.
From the second part,
x must be in the interval
−‌<x<‌.
The intersection of these conditions is empty, as there is no number that simultaneously satisfies
‌<x<2 and
−‌<x<‌.
Hence, the domain of the function is a null set.