Let , and be real-valued functions defined on the interval by and and . If , and denote respectively the absolute maximum of , and on then
Determine the relation between , and .
Step 1: From the equation
Consider the given equation as:
From the above Equation, we get only positive values, so that then the function is increasing function than the
Considering the maximum value then the function becomes:
Step 2: From the equation
Consider the given equation as:
From the above Equation, we get only positive values, so that then the function is increasing function than the
Considering the maximum value then the function becomes:
Step 3: From the equation
Consider the given equation as
From the above Equation, we get only positive values, so that then the function is increasing function than the
Considering the maximum value then the function becomes:
Since, , and denote respectively the absolute maximum of , and on then
Hence, the correct answer is Option D.