Find the derivative of the following functions.
y = x In...

Question

Find the derivative of the following functions.

y = x In x - x

Accepted Answer

Hello 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. Find the derivative of the function Y equals 3x2 multiplied by the natural log of X minus 3x the power of 2. Awesome. So it appears for this particular problem, we're ultimately trying to figure out what the derivative of Y is. So we're trying to find the derivative of this function of Y. So now that we know that we're trying to solve once again for the derivative of this function of Y, we need to note that in order to perform this particular derivative, so prior to any differentiation that we're going to need to do, we need to factorize our given function. So we need to state that Y equals 3 X 2 multiplied by the natural log of X minus 1. Fantastic. Now, our second step is we need to recognize the fact that we are given a product of two functions. So let us state that F is equal to 3 x 2, and let us state that G equals the natural log of X minus 1. So now our third step is we need to recall and apply the product rule of differentiation, which, as we should recall, Y, which this prime symbol indicates the first derivative, and it looks like an apostrophe in the power. And this Y once again is the first derivative of the function of Y. So Y is equal to F multiplied by G, which is equal to F multiplied by G plus, so multiplied by G plus F multiplied by G. So that is our product rule, as we should recall. So, therefore, We could go ahead and write that. Y is equal to 3 X 2 multiplied by the natural log of X minus 1. Plus 3 X to the power of 2 multiplied by the natural log of X minus 1. So now our fourth step is we need to evaluate the first derivative F using the power rule, which, as we should recall, the power rule states that x the power of n is equal to n multiplied by X of N minus 1. Fantastic. So, therefore, when we evaluate the first derivative of F using the power rule, we will find that 3 x to the power of 2 is equal to 3 multiplied by X 2, which is equal to 3 multiplied by 2 multiplied by X to the power of 2 minus 1, which is equal to 6 X ultimately. And our 5th step is we need to evaluate the second derivative, and we need to recall that the natural log prime of X is equal to 1 divided by X, and we also need to know that CX is equal to 0, where C denotes a constant term or a constant variable. Fantastic. So keeping these two. Important rules in mind, we could go ahead and write that the natural log of X minus 1 is equal to the natural log of X minus 1. So prime, so so so basically, so the natural log of X minus 1 is equal to the natural log of X minus 1, which is going to be all equal to 1 divided by X. Fantastic. So now, our next step, which is our 6th and final step, we need to substitute into it, we need to substitute these values into our expression that is given to us in step 3. So we need to go ahead and write that Y. is equal to 6 x multiplied by the multiplied by the natural log of x minus 1 plus 3 x 2 multiplied by 1 divided by X, which is equal to 6 X multiplied by the natural log of X minus 6 X plus 3 X, which when we simplify a little bit, we will find that Y is equal to 6 X multiplied by the natural log of X minus 3 X. And when we simplify one last time, when we factor out like terms, we will find that Y is equal to 3 X multiplied by 2 multiplied by the natural log of X minus 1. And that is it. That is our final answer. Hooray, we did it. We found the first derivative of Y. So in conclusion, the derivative of the function of Y is Y is equal to 3x multiplied by 2 multiplied by the natural log of X minus 1. Thank you so much for watching. Hopefully that helped, and I can't wait to see you in the next video. Bye.

Find the derivative of the following functions.
y = x In x - x

Key Concepts

Derivative

Product Rule

Natural Logarithm

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