Is the Intermediate Value Theorem basically saying that if a function is continuous on an interval, then the function is surjective? The formal definition states something to the effect of "any value in the domain will map to a value in the range", unless I misunderstand it. So, since we're mapping from [a,b]->[f(a),f(b)], the range is made up of the images of the values in the domain, that is, the range is the codomain. My understanding of a surjective function is one in which AAx in D,f(x) in C, where f:D->C.

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

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A. 4.2
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C. 4.7
D. 5.1

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