To evaluate log₂(32), we need to find the exponent to which we need to raise 2 to get 32. In other words, we are looking for “x” in the equation 2^x = 32.
To solve this equation, one approach is to express 32 as a power of 2. We can rewrite 32 as 2^5, since 2^5 = 32. So, log₂(32) can be simplified as:
log₂(32) = log₂(2^5) = 5
Therefore, log₂(32) is equal to 5.
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