Implicit Differentiation Related Rates. Read the problem, drawing a picture No non-constants on the picture Write an equation Differentiate implicitly.

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Implicit Differentiation Related Rates

Read the problem, drawing a picture No non-constants on the picture Write an equation Differentiate implicitly Enter non-constants and solve

Related Rates Suppose a painter is standing on a 13 foot ladder and Joe ties a rope to the bottom of the ladder and walks away at the rate of 2 feet per second.

Related Rates Suppose a painter is standing on a 13 foot ladder and Joe ties a rope to the bottom of the ladder and walks away at the rate of 2 feet per second. How fast is the painter falling when x = 5 feet?

Related Rates Write an equation Differentiate the equation implicitly 2x x’ + 2y y’ = 0 or xx’ + yy’ = 0 If Joe pulls at 2 ft./sec., find the speed of the painter when x = 5.

Related Rates Use algebra to find y. x 2 + y 2 = y 2 = 169 y 2 = 169 – 25 = 144 y 2 = 169 – 25 = 144 y = 12 y = 12

Related Rates Back to the calculus with y = 12, x = 5, and x’ = 2 ft/sec xx’ + yy’ =0 5(2) + 12(y’) = 0 y’ = -10/12 = -5/6 ft./sec. y’ = -10/12 = -5/6 ft./sec.

Related Rates Summary Even though Joe is walking 2 ft/sec, the painter is only falling -5/6 ft/sec. If the x and y values were reversed, If the x and y values were reversed, 12(2) + 5(y’) = 0 or y’ = -24/5.

Related Rates Summary

Suppose a 6 ft tall person walks away from a 13 ft lamp post at a speed of 5 ft per sec. How fast is the tip of his shadow moving when 12 ft from the post?

Related Rates Suppose a 6 ft tall person walks away from a 13 ft lamp post at a speed of 5 ft per sec. How fast is the tip of his shadow moving when 12 ft from the post?

Related Rates Suppose a 6 ft tall person walks away from a 13 ft lamp post at a speed of 5 ft per sec. How fast is the tip of his shadow moving when 12 ft from the post?

Related Rates The tip of the shadow has a speed of (s+x)’, not s’. What is s’? s’ is the growth of the shadow and includes getting shorter on the right.

Related Rates Cross multiplying

Related Rates Thus s’ is and and Note that the tip is moving almost twice as fast as the walker, and more than twice as fast as the shadow regardless of x.

Related Rates Suppose air is entering a balloon at the rate of 25 cubic feet per minute. How fast is the radius changing when r = 30 feet?

Related Rates r’ = r’ = ft per min ft per min

Related Rates Suppose a radar gun on first base catches a baseball 30 feet away from the pitcher and registers 50 feet per second. How fast is the ball really traveling?

Related Rates The calculus. X = 30 y’ = 50 y = ? The algebra.

Related Rates X = 30 y’ = 50 y = ? Back to the calculus.

Related Rates Back to the calculus. X = 30 y’ = 50 y = ?

Related Rates Back to the calculus. X = 30 y’ = 50 y = ?

Related Rates x’ = feet/sec. X = 30 y’ = 50 y = ?

Related Rates Read the problem, drawing a picture No non-constants on the picture Write an equation Differentiate implicitly Enter non-constants and solve