To find the domain of the function
f(x)=sin‌−1(log2(‌)), we need to determine where the expression
log2(‌) falls within the domain of the inverse sine function, which is
[−1,1].
First, ensure that:
−1≤log2(‌)≤1This inequality translates to:
2−1≤‌≤2Solving the inequality:
‌≤‌≤2Multiply through by 2 to clear the fraction:
1≤x2≤4This implies that
x must satisfy:
x∈[−2,−1]∪[1,2]We also need to ensure that
‌≥0, which is always true since
x2≥0.
Therefore, considering the intersection of the feasible solutions:
x∈[−2,−1]∪[1,2]Thus, the domain of the function is:
x∈[−2,−1]∪[1,2]