For example, to prove that the function x^8+x−1=0 has exactly two roots, we first prove that f has at most 2 real roots by using differentiation. f′(x)=8x^7+1=0, by using that the function has two roots and therefore it should have at least one point such that f'(c)=0 and then we use the IVT to prove that it has exactly two roots. However, the derivative of equation x^4−6x^2−8x+1=0 has 2 roots but still, I should try to prove that it has exactly two roots. If its derivative had one solution, then I could first prove that it has two roots at most as I did but it has two roots, so how should we approach the problem?

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D) $c_1{e}^{-<!--\; -\; -->2x}+c_2{2}^{-<!--\; -\; -->x}$

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