For a real number r let [r] denote the largest integer less than or equal to r. Let `agt1` be a real number which is not an integer and let k be the s
For a real number r let [r] denote the largest integer less than or equal to r. Let `agt1` be a real number which is not an integer and let k be the smallest positive integer positive integer such that `[a^(k)]gt[a]^(k)`. Then which of the following statements is always true?
A. `kle2([a]+1)^(2)`
B. `kle2([a]+1)^(4)`
C. `kle2^([a]+1)`
D. `kle(1)/(a-[a])+1`
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