f(x)=x^2 is continuous on [1,2] but does not assume the values 2 intermediate between the value 1 and 4. I do not understand what they mean. For me, sqrt(2) in [1,2] and f(sqrt2)=2. Also, using the the intermediate value theorem, since f is continuous on [1,2] and f(1)=1<2<4=f(2), there exists c in[1,2] such that f(c)=2. Can I get some explanation about this?

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