![]() ![]() On the other hand, the function in the denominator is g(x). Therefore, suppose your function in the numerator if f(x). So, we use the quotient rule when we need to find the derivative of the quotient of two functions. Hence, this would be in the format of d/dx ((f(x)) * (g(x))). On the other hand, we use the product rule when we simply multiply two functions and then need to find out their derivative.Hence, one must use the product rule while considering the quotient of the two functions that one has. In this case, the addition of the product of the derivative of the first function with the second function and the product of the derivative of the second function with the first function gives the derivative of the product of the two functions. The product rule is again a formulaic application one uses in differentiation problems. It might sound a bit complex but it is not so. However, all this while the denominator is the square of the original denominator function. ![]() You can define the quotient rule as the product of the denominator and the derivative of the numerator subtracted from the product of the numerator and the derivative of the denominator. ![]() So, begin with the bottom function and end by squaring the same. There is a particular way in which you must remember the quotient rule. So, in this case, one function divides another. Quotient rule is a formulaic application one uses in differentiation problems. ![]()
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