QuestionCheck if equals for and . Simplify .
Studdy Solution
STEP 1
Assumptions1. The function is defined as
. The function is defined as
3. We need to check if the composition of functions is equivalent to
STEP 2
First, let's find , which means we apply the function first and then apply the function to the result.
STEP 3
Now, substitute into .
STEP 4
Substitute the definition of into the equation.
STEP 5
implify the equation.
STEP 6
Further simplify the equation.
STEP 7
Now, let's find , which means we apply the function first and then apply the function to the result.
STEP 8
Now, substitute into .
STEP 9
Substitute the definition of into the equation.
STEP 10
implify the equation.
STEP 11
Further simplify the equation.
STEP 12
Now that we have both and , we can compare them to check if they are equivalent.
From the above, we can see that is not equivalent to .
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