MATH 200 GOALS Be able to compute partial derivatives with the various versions of the multivariate chain rule. For a ﬁrst look at it, let’s approach the last example of last week’s lecture in a diﬀerent way: Exercise 3.3.11 (revisited and shortened) A stone is dropped into a lake, creating a cir-cular ripple that travels outward at a … The chain rule is a simple consequence of the fact that di erentiation produces the linear approximation to a function at a point, and that the derivative is the coe cient appearing in this linear approximation. Problems may contain constants a, b, and c. 1) f (x) = 3x5 2) f (x) = x 3) f (x) = x33 4) f (x) = -2x4 5) f (x) = - 1 4 Derivatives - Sum, Power, Product, Quotient, Chain Rules Name_____ ©W X2P0m1q7S xKYu\tfa[ mSTo]fJtTwYa[ryeD OLHLvCr._ ` eAHlblD HrgiIg_hetPsL freeWsWehrTvie]dN.-1-Differentiate each function with respect to x. Then differentiate the function. The Chain Rule Suppose we have two functions, y = f(u) and u = g(x), and we know that y changes at a rate 3 times as fast as u, and that u changes at a rate 2 times as fast as x (ie. Now let = + − , then += (+ ). Although the memoir it was first found in contained various mistakes, it is apparent that he used chain rule in order to differentiate a polynomial inside of a square root. In other words, we want to compute lim h→0 f(g(x+h))−f(g(x)) h. f0(u) = dy du = 3 and g0(x) = du dx = 2). The chain rule is the most important and powerful theorem about derivatives. VCE Maths Methods - Chain, Product & Quotient Rules The chain rule 3 • The chain rule is used to di!erentiate a function that has a function within it. Then lim →0 = ′ , so is continuous at 0. Diﬀerentiation: Chain Rule The Chain Rule is used when we want to diﬀerentiate a function that may be regarded as a composition of one or more simpler functions. Be able to compare your answer with the direct method of computing the partial derivatives. Present your solution just like the solution in Example21.2.1(i.e., write the given function as a composition of two functions f and g, compute the quantities required on the right-hand side of the chain rule formula, and nally show the chain rule being applied to get the answer). Be able to compute the chain rule based on given values of partial derivatives rather than explicitly deﬁned functions. y=f(u) u=f(x) y=(2x+4)3 y=u3andu=2x+4 dy du =3u2 du dx =2 dy dx What if anything can we say about (f g)0(x), the derivative of the composition If our function f(x) = (g h)(x), where g and h are simpler functions, then the Chain Rule may be stated as f ′(x) = (g h) (x) = (g′ h)(x)h′(x). Let’s see this for the single variable case rst. Many answers: Ex y = (((2x + 1)5 + 2) 6 + 3) 7 dy dx = 7(((2x + 1)5 + 2) 6 + 3) 6 ⋅ 6((2x + 1)5 + 2) 5 ⋅ 5(2x + 1)4 ⋅ 2-2-Create your own worksheets like this … 21{1 Use the chain rule to nd the following derivatives. Proving the chain rule Given ′ and ′() exist, we want to find . Chain Rule of Calculus •The chain rule states that derivative of f (g(x)) is f '(g(x)) ⋅g '(x) –It helps us differentiate composite functions •Note that sin(x2)is composite, but sin (x) ⋅x2 is not •sin (x²) is a composite function because it can be constructed as f (g(x)) for f (x)=sin(x)and g(x)=x² –Using the chain rule … Call these functions f and g, respectively. The Chain Rule is thought to have first originated from the German mathematician Gottfried W. Leibniz. (Section 3.6: Chain Rule) 3.6.2 We can think of y as a function of u, which, in turn, is a function of x. 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