Given f (the 6th power of x)= log is the logarithm of the base x of 2, what is f (8) equal to? Given that f (6th power of x)= log is the logarithm of the base x of 2, what is f (8) equal to?

Given f (the 6th power of x)= log is the logarithm of the base x of 2, what is f (8) equal to? Given that f (6th power of x)= log is the logarithm of the base x of 2, what is f (8) equal to?

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Given the first power of 2=2, the second power of 2=4, the third power of 2=8, the fourth power of 2=16, the fifth power of 2=32, the sixth power of 2=64, the seventh power of 2=128, the eighth power of 2=256 Please guess (2+1)(2+1)(2+1)(2+1)... What is the number of bits of (2 to the 32nd power +1)? 1 Of 2=2,2 of 2=4,2 of 3=8,2 of 4=16,2 of 5=32,2 of 6=64,2 of 7=128,2 of 8=256 Please guess (2+1)(2+1)(2+1)(2+1)... What is the number of bits of (2 to the 32nd power +1)?

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