Question

(a) If \(f(2)=4,\) can you conclude anything about the limit of \(f(x)\) as \(x\) approaches 2\(?\) Explain your reasoning. (b) If the limit of \(f(x)\) as \(x\) approaches 2 is \(4,\) can you conclude anything about \(f(2) ?\) Explain your reasoning.

Short answer

No, knowing the value of the function at a point does not allow you to conclude about the limit at that point. Similarly, knowing the limit of the function at a certain point doesn't necessarily give information about the value of the function at that point.

Step-by-step solution

Analyzing Statement (a)

Given that \(f(2)=4\), it cannot automatically be concluded that the limit of \(f(x)\) as \(x\) approaches 2 is also 4. The value of a function at a certain point doesn't necessarily determine the limit of the function at that point. The limit at a point depends on the behavior of the function as it approaches that point, not necessarily its exact value at that point.

Analyzing Statement (b)

Knowing that the limit of \(f(x)\) as \(x\) approaches 2 is 4, doesn't guarantee that \(f(2) = 4\). A function can approach a certain limit as \(x\) approaches a value, but the function does not necessarily take that limit value at the actual point. The actual value of the function at that point can be different or undefined, thus it is not necessary that \(f(2) = 4\).