Given a sequence \( e_1, e_2,... e_7. \)
In the sequence shown, \( e_n= e_{n-1}^k \), where \( 2 \leq n \leq 7 \) and \( k \) is a nonzero constant. How many of the terms in the sequence are greater than \( 27^9 \)?
(1) \( e_1= 3 \)
(2) \( e_4= 3^{27} \)
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In the sequence shown, \( e_n= e_{n-1}^k \), where \( 2 \leq n \leq 7 \) and \( k \) is a nonzero constant. How many of the terms in the sequence are greater than \( 27^9 \)?
(1) \( e_1= 3 \)
(2) \( e_4= 3^{27} \)
Posted from my mobile device
