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Published byTyrone Carroll Modified over 9 years ago
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Science Starter! Draw a free-body diagram for: 1)A chair at rest on the floor. 2) A ball rolling to the right and slowing down across a grassy field.
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1.) 2.)
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according to Newton’s 1 st Law: - objects at rest remain at rest unless a force is applied to move them - objects in motion stay in motion unless a force is applied to change their speed or direction Remember that….
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Newton’s Second Law The net force applied to an object to change its state of motion is directly proportional to the object’s mass and resulting acceleration of the object.
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Newton’s 2 nd Law (formula form) F Net = ma F net (or ΣF): “Net Force” - The vector sum of all forces acting on an object [Newtons (N)] m: mass (kg) a: acceleration (m/s 2 )
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Weight vs. Mass Weight: “F g ” force of gravity pulling on an object F = ma a acceleration “g” acceleration due to gravity (9.8 m/s 2 ) THEREFORE: F g = mg
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Example A ball has a mass of 8.0 kg. What is the ball’s weight on earth ? (1) m = 8.0 kg g = 9.8 m/s 2 F g = ? (2) F g = mg (3) F g = (8.0 kg) (9.8 m/s 2 ) (4-5) F g = 78.4 N
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Net Force Forces in “x” direction can be added, Forces in “y” direction can be added: Can be written as: F NET x OR Σ F x F NET y OR Σ F y CHEAT: Direction of acceleration is the POSITIVE DIRECTION
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Example 1 A 10 kg wagon is being pulled to the right with 20 N of force. Between the tires and the ground, there is 12 N of friction. a) Draw a free-body diagram. b) Write an “F NET Equation” for the vertical and horizontal directions. c) Determine the acceleration of the wagon.
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Σ F y = F N – F g Σ F x = F – F f (0) = F N – (10)(9.8)m(a) = F – F f 10 (a) = (20) – (12) 10 (a) = 8 a = 0.8 m/s 2
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Two students are playing tug-of-war over a 15 kg crate. Joe pulls to the right with 40 N of force, while Bob pulls to the left with 60 N of force. The frictional force between the crate and the ground is 5 N. a) Draw a free-body diagram. b) Write an “F NET Equation” for the vertical and horizontal directions. c) Determine the acceleration of the crate. Example 2
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Σ F y = F N – F g Σ F x = F Bob – F f – F Joe (0) = F N – (15)(9.8) m(a) = F Bob – F f – F Joe 15 (a) = (60) – (5) – (40) 15 (a) = 15 a = 1.0 m/s 2
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Hooke’s Law: the Spring Force Robert Hooke: F s = kx F s : Spring Force (N) k: Spring Constant (N/m) x: Stretch distance (m)
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Example 3 A 5 kg mass hangs from a spring of spring constant 120 N/m. How far will the spring stretch once the mass is at rest? a) Draw a free-body diagram of the mass. b) Write an “F NET Equation” for the vertical and horizontal directions. c) Determine the stretch distance of the spring. How many centimeters is this?
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Σ F y = F s – F g Σ F x = 0 (m)(a) = (k)(x) – (m)(g) 5 (0) = (120)(x) – (5)(9.8) 0 = 120 (x) – 49 49 = 120 x x = 0.408 m = 40.8 cm
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