Suppose f:[1,2]->[5,7] is continuous. Show that f(c)=2c+3 for some c in [1,2]. First note f(1)=5 and f(2)=7. By the IVT, all values c in [1,2] are hit. I'm just wondering how to put all of these facts together to arrive at f(c)=2c+3 for all c in [1,2].

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