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The product rule is one of the derivative rules that we use to find the derivative of functions of the form P(x) = f(x)·g(x). The derivative of a function P(x) is denoted by P'(x).

1:45 6:17 EASIEST WAY to Remember the Product Rule and How to Use It Easily YouTube Start of suggested clip End of suggested clip In the key is that you're multiplying the derivative of one thing times the original of the otherMoreIn the key is that you're multiplying the derivative of one thing times the original of the other thing. And then adding. In the original.

The product rule of differentiation is a rule for differentiating problems where one function is multiplied by another function. According to this rule, first function times the derivative of second function is added to second function times the derivative of first function.

How to Apply Product Rule in Differentiation? Step 1: Note down the values of f(x) and g(x). Step 2: Find the values of f'(x) and g'(x) and apply the product rule formula, given as: h'(x) = ddx d d x f(x)·g(x) = [g(x) × f'(x) + f(x) × g'(x)]

0:47 5:12 So at the first means is the derivative of the first thing multiplied by the second plus the firstMoreSo at the first means is the derivative of the first thing multiplied by the second plus the first multiplied by D second in D second is just a direct derivative of the second thing.

The Product Rule must be utilized when the derivative of the product of two functions is to be taken. The Product Rule says that the derivative of a product of two functions is the first function times the derivative of the second function plus the second function times the derivative of the first function.

0:00 3:23 Basic Product Rule Example #1 - YouTube YouTube Start of suggested clip End of suggested clip All right in this video I'm gonna look at some examples related to the product rule and the productMoreAll right in this video I'm gonna look at some examples related to the product rule and the product rule again says if you have a function times another function and we want to take the derivative.

0:47 5:12 Product Rule - YouTube YouTube Start of suggested clip End of suggested clip So at the first means is the derivative of the first thing multiplied by the second plus the firstMoreSo at the first means is the derivative of the first thing multiplied by the second plus the first multiplied by D second in D second is just a direct derivative of the second thing.

A good way to remember the product rule for differentiation is ``the first times the derivative of the second plus the second times the derivative of the first. '' It may seem non-intuitive now, but just see, and in a few days you'll be repeating it to yourself, too.

1:45 6:17 In the key is that you're multiplying the derivative of one thing times the original of the otherMoreIn the key is that you're multiplying the derivative of one thing times the original of the other thing. And then adding. In the original.