For x 0, what is f′(x)?

Question

For x > 0, what is f′(x)?

Accepted Answer

Below there, today we're going to solve the following practice problem together. So first off, let us read the problem and highlight all the key pieces of information that we need to use in order to solve this problem. Given the function F of X is equal to Curly bracket of 3 x minus 9 if X is less than or equal to 3 and 3 x minus 7 if X is greater than 3. Find F of X if X is greater than 3. Awesome, so it appears for this particular problem we're asked to find F of X if X is greater than 3. So it sounds like we are trying to figure out the first derivative of this F of X function considering that X is greater than 3. So now that we know that we're trying to solve for F of X, let's read off our multiple choice answers to see what our final answer might be. A is -7, B is -3, C is -1, and D is 3. Awesome. So, first off, in order to solve this problem, let us recall and note that for X is greater than 3, we need to note that F of X is equal to 3X minus 7. So now our next step is we need to recall and use the following derivative function that states that F of X is equal to the limit evaluated at H approaches 0 F X plus H minus F of X all divided by H. Fantastic. So now we need to solve for F of X plus H first. So F of X plus H is equal to 3 multiplied by X plus H minus 7 means we're plugging in X plus H in for X for our original function for F of X. So, when we do this and we simplify, we will find that it's equal to 3 X plus 3H minus 7. Fantastic. So now we can go ahead and solve for our first derivative, so we could say that F of X. is equal to the limit evaluated at H approaches 0 of F of X plus H minus F of X all divided by H, which is equal to the limit as so this is the which is equal to the limit as H approaches 0 of 3 X. Plus 3 H minus 7, minus plugging in our value for F of X, which is 3X minus 7, all divided by H, which is all equal to the limit, as H approaches 0 of 3 X plus 3H minus 7, minus 3X plus 7. Fantastic, so 3 X plus 7. All divided by H, which is all equal to the limit as H approaches 0, so the limit as H approaches 0 of 3 H divided by H. 3 H divided by H, which is equal to the limit as H approaches 0 of 3, which is equal to. Drum roll 3. So that is our final answer. Hooray, we did it. So looking at our multiple choice answers, our final answer has to be the letter D, which once again is 3. Thank you so much for watching. Hopefully that helped, and I can't wait to see you in the next video. Bye.

For x > 0, what is f′(x)?

Key Concepts

Derivative

Function Notation

Limits

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