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MTH 104 Lecture # 9 Calculus and Analytical Geometry Chain rule Consider d x 1 dx 100 2 let y x 1 100 2 then y u dy 100u du and u x 1 2 100 99 du 2x dx and dy dy du dx du dx 100u 2 x 99 100( x 1) 2 x 2 200 x ( x 1) 2 multiply rates Chain rule If g is differentiable at x and f is differentiable at g(x) then the composition fog is differentiable at x. Moreover, if y f ( g ( x)) and u g ( x) dy dy du dx du dx Then y=f(u) and Alternatively d f g x f g x f g x g x dx Derivative of outside function Derivative of inside function Example Find dy if y cos( x ) 3 Let ux 3 Then y cosu dy du sin u du dx 3x And Rates of change multiply 2 dy dy du dx du dx ( sin u) (3x ) 2 3x sin x 2 3 Example d d d tan x tan x (2 tan x) tan x 2 tan x sec x dx dx dx 2 2 2 Derivative of outside function Derivative of inside function d 1 d d x 1 x 1 x 1 x 1 dx 2 dx dx 1 x 2x 2 x 1 x 1 2 2 2 1 2 2 2 1 2 2 More examples 1) f ( x) (3x 5x ) 2 7 2) f (t ) Solution 1) du 2 Let u 3x 5 x 3 10 x dx dy 7 Then y u 7u 6 du dy dy du dx du dx dy 7u 6 (3 10 x) dx 7(3x 5 x 2 )6 (3 10 x) 5 7t 9 2 2) f (t ) Let 5 7t 9 2 du u 7t 9 7 dt 5 y 5u 2 dy 10u 3 du u2 dy dy du dt du dt dy 10u 3 7 dx dy 70(7t 9) 3 dt Generalized derivative formulas d du f (u ) f (u ) dx dx where u g ( x) Some examples are: d r du r 1 u ru dx dx d cos u sin u du dx dx d du 2 cot u csc u dx dx d csc u csc u cot u du dx dx d du sin u cos u dx dx d tan u sec 2 u du dx dx d du sec u sec u tan u dx dx Example d d sin(2 x) cos 2 x dx 2 x 2cos 2x dx 1. 2. d 1 d x 2 x 3 dx x 2 x 3 dx 2 d x3 2 x 3 x3 2 x 3 dx 1 3 3 x 2 x 3 3x 2 2 3 2 3x 2 x 2 x 3 2 3 2 d y dx 2 Example Find if y sin(3 x ) 2 2 Solution dy d sin(3x ) dx dx d cos(3x ) 3x dx 2 2 2 6 x cos(3x ) d y d 6 x cos(3x ) dx dx d d 6 x cos 3x cos(3x ) 6 x dx dx 2 2 2 2 2 2 d d 6 x cos 3x cos(3x ) 6 x dx dx d 6cos(3x ) 6 x sin(3x ) 3x dx 2 2 2 2 2 6 x 6 x sin(3x ) 6cos 3x 2 d y 36 x sin 3x 6cos 3x dx 2 2 2 2 2 2 Example Differentiate y ln x 2 1 1 y 2 (2 x) x 1 2x y 2 x 1 y ln x 2 1 Use the Chain Rule x Example Differentiate y x ln x y Use the Quotient ln x Rule 1 ln x(1) x x y 2 ln x ln x 1 y 2 ln x Related rates Consider a water is draining out of a conical filter. The volume V, the height h and the radius r are all functions of the elapsed time t. Volume formula: V 3 r 2h dV rate of change of V dt dV d [ r h] dt 3 dt 2 dV dr 2 dh [2hr r ] dt 3 dt dt The rate of change of V is related to the rates of change both r and h Ralated rates problem Example Suppose that x and y are differentiable functions of t 3 and are related by the equation y x . Find dy/dt at time t=1 if x=2 and dx/dt=4 at time t=1. solution dx Known: x 2, dt 3 yx 4 Unknown: t=1 Differentiating both sides with respect to t dy d 3 2 dx x 3x dt dt dt dy dt 3(2) t 1 2 dx dt 12 4 48 t 1 dy dt t=1 Example Suppose x and y are both differentiable functions of t and are related by the equation y = x2 + 3. Find dy/dt, given that dx/dt = 2 when x = 1 Solution Given dx/dt = 2 when x = 1 y = x2 + 3 d d 2 [ y ] [ x 3] dt dt dy dx 2x dt dt dy dt x 1 dx 2(1) dt 2 24 x 1 To find dy/dt Procedure for solving related rates problems Step 1. Assign letters to all quantities that vary with time and any others that seem relevant to the problem. Give a definition for each letter. Step 2. Identify the rates of change that are known and the rates of change that is to be found. Interpret each rate as a derivative. Step 3. Find an equation that relates the variables whose rates of change were identified in Step 2. To do this, it will often be helpful to draw an appropriately labeled figure that illsutrates the relationship. Step 4. Differentiate both sides of the equation obtained in Step 3 with respect to time to produce a relationship between the known rates and the unknown rates of change. Step 5. After completing Step 4, substitute all known values for the rates of change and the variables, and then solve for the unknown rate of change. Example Suppose that z x3 y 2 , where both x and y are changing with time. At a certain instant when x=1 and y=2, x is decreasing at the rate of 2 units/s, and y is increasing at the rate of 3 units/s. How fast is z changing at this instant? Is z increasing or decreasing? solution dx Known: dt dy dt 2, x 1 y 2 3 x 1 y 2 zx y 3 2 Differentiating with respect to t dz d 3 2 x y dt dt dz Unknown: dt x 1 y 2 dz 2 d 3 3 d 2 y x x y dt dt dt dx 3 dy 3x y 2x y dt dt 2 dz dt dz dt 2 3(1) (2) 2 x 1 y 2 2 dx dt dy 2(1) (2) dt 3 x 1 y 2 12(2) 4(3) 12 units/s x 1 y 2 Negative sign shows that it is decreasing x 1 y 2 Example A stone is dropped into a still pond sends out a circular ripple whose radius increases at a constant rate of 3ft/s. How rapidly is the area of enclosed by the ripple increases at the end of 10 s? Solution let r= radius of circular ripple, A= Area enclosed by the ripple dA dr Given 3, To find dt dt r 10 Since radius is increasing with a constant rate of 3 ft/s, so after 10 s the radius will be 30 ft. We know that A r2 dA dr 2 r dt dt dA dt 2 (30)(3) 180 ft 2 / s r 10