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Recurrence Relationshard
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For the recurrence an=1.05an−1−0.05an−2,a_n = 1.05a_{n-1} - 0.05a_{n-2},an​=1.05an−1​−0.05an−2​, the characteristic equation r2−1.05r+0.05=0r^2 - 1.05r + 0.05 = 0r2−1.05r+0.05=0 has roots r1=1r_1 = 1r1​=1 and r2=0.05r_2 = 0.05r2​=0.05.

Given that the general solution is an=c1⋅1n+c2⋅0.05na_n = c_1 \cdot 1^n + c_2 \cdot 0.05^nan​=c1​⋅1n+c2​⋅0.05n with c1≠0c_1 \neq 0c1​=0, what best describes the long-term behavior?