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4.6 Related rates

4.6 Related rates. Useful formulae. a^2 +b^2 = c^2 Cube V= s^3 Sphere V= 4/3 pi r^3 SA=4 pi r^2 Cone V= 1/3 pi r^2 h Lateral SA= pi r (r^2 + h^2)^(1/2) Right circular cylinder V=pi r^2 h Lateral SA= 2 pi r h Circle A= pi r^2 C= 2 pi r.

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4.6 Related rates

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  1. 4.6 Related rates

  2. Useful formulae • a^2 +b^2 = c^2 • Cube V= s^3 • Sphere V= 4/3 pi r^3 • SA=4 pi r^2 • Cone V= 1/3 pi r^2 h • Lateral SA= pi r (r^2 + h^2)^(1/2) • Right circular cylinder V=pi r^2 h • Lateral SA= 2 pi r h • Circle A= pi r^2 • C= 2 pi r

  3. triples • 3,4,5 • 5,12,13 • 6,8,10 • 7,24,25 • 8,15,17 • 9,12,15

  4. Implicit differentiation • Change wrt time • Each changing quantity is differentiated wrt time.

  5. Examplethe radius of a circle is increasing at 0.03 cm/sec. What is the rate of change of the area at the second the radius is 20 cm?

  6. Example A circle has area increasing at 1.5 pi cm^2/min. what is the rate of change of the radius when the radius is 5 cm?

  7. Example • Circle • Area decreasing 4.8 pi ft^2/sec • Radius decreasing 0.3 ft/sec • Find radius

  8. Example What is the radius of a circle at the moment when the rate of change of its area is numerically twice as large as the rate of change of its radius?

  9. Example The length of a rectangle is decreasing at 5 cm/sec. And the width is increasing at 2 cm/sec. What is the rate of change of the area when l=6 and w=5?

  10. Same rectangle • Find rate of change of perimeter • Find rate of change of diagonal

  11. Example The edges of a cube are expanding at 3 cm/sec. How fast is the volume changing when: e= 1 cm e=10 cm

  12. Example V= l w h dV/dt=

  13. Example A 25 ft ladder is leaning against a house. The bottom is being pulled out from the house at 2 ft/sec.

  14. Part a How fast is the top of the ladder moving down the wall when the base is 7 ft. from the end of the ladder?

  15. Part b Find the rate at which the area of the triangle formed is changing when the bottom is 7 ft. from the house.

  16. Part c Find the rate at which the angle between the top of the ladder and the house changes.

  17. Spherical soap bubble • r= 10 cm • air added at 10 cm^2/sec. • Find rate at which radius is changing.

  18. Rectangular prism • Length increasing 4 cm/sec • Height decreasing 3 cm/sec • Width constant • When l=4.w=5,h=6 • Find rate of change of SA

  19. Cylindrical tank with circular base • Drained at 3 l/sec • Radius=5 • How fast is the water level dropping?

  20. Cone-shaped cup Being filled with water at 3 cm^3/sec H=10, r=5 How fast is water level rising when level is 4 cm.

  21. Cone, r=7,h=12 • Draining at 15 m^3/sec • When r=3 • How fast is the radius changing?

  22. Cone, r=10, h=7 • Filled at 2 m^3/sec • H=5m • How fast is the radius changing?

  23. Water drains from cone at the rate of 21 ft^3/min. how fast is the water level dropping when the height is 5 ft? • Cone, r=3, h=8

  24. A hot-air balloon rises straight up from a level field. It is tracked by a range-finder 500 ft from lift-off. When the range-finder’s angle of elevation is pi/4, the angle increases at 0.14 rad/min. How fast is the balloon rising?

  25. P 329 19 20

  26. A 5 ft girl is walking toward a 20 ft lamppost at the rateof 6 ft/sec. How fast is the tip of her shadow moving?

  27. A 6 ft man is moving away from the base of a streetlight that is 15 ft high. If he moves at the rate of 18 ft/sec., how fast is the length of his shadow changing?

  28. A balloon rises at 3 m/sec. from a point on the ground 30 m from an observer. Find rate of change of the angle of elevation of the balloon from the observer when the balloon is 30 m above ground.

  29. P 326 30 32 31

  30. 4.7 Mean Value Theorem Sure you remember!!! f’ ( c ) = f(b)-f(a) b-a

  31. 4.7 Mean Value Theorem Sure you remember!!! And Corollary 1 is the first derivative test for increasing and decreasing.

  32. Corollary 2 If f’(x)=0 for all x in (a,b) then there is a constant ,c, such that f (x) = c, for all x in (a,b).

  33. Corollary 2 This is the converse of : the derivative of a constant is zero.

  34. Corollary 3 If F’(x)=G’(x) at each x in (a,b), then there is a constant,c, such that F(x)=G(x)+c for all x in (a,b).

  35. Definitions • Antiderivative • General antiderivative • Arbitrary constant

  36. antiderivative A function F is an anti-derivative of a function f over an interval I if F’(x)=f(x) At every point of the interval.

  37. General antiderivative If F is an antiderivative of f, then the family of functions F(x)+C (C any real no.) is the general antiderivative of f over the interval I.

  38. Arbitrary constant The constant C is called the arbitrary constant.

  39. 4.7 Initial value problems • Uses general antiderivatives • With “initial values” • To find the specific function of the family

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