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Show that the acceleration of any object down a frictionless incline that makes an angle θ size 12{θ} {} with the horizontal is a = g sin θ size 12{a=g"sin"θ} {} . (Note that this acceleration is independent of mass.)

Show that the acceleration of any object down an incline where friction behaves simply (that is, where f k = μ k N size 12{f rSub { size 8{k} } =μ rSub { size 8{k} } N} {} ) is a = g ( sin θ μ k cos θ ). size 12{a=g \( "sin"θ - μ rSub { size 8{k} } "cos"θ \) } {} Note that the acceleration is independent of mass and reduces to the expression found in the previous problem when friction becomes negligibly small ( μ k = 0 ). size 12{ \( μ rSub { size 8{k} } =0 \) "." } {}

Calculate the deceleration of a snow boarder going up a 5.0º size 12{5 "." 0°} {} , slope assuming the coefficient of friction for waxed wood on wet snow. The result of [link] may be useful, but be careful to consider the fact that the snow boarder is going uphill. Explicitly show how you follow the steps in Problem-Solving Strategies .

1 . 83 m/s 2 size 12{ - 1 "." "83"" m/s" rSup { size 8{2} } } {}

(a) Calculate the acceleration of a skier heading down a 10 . size 12{"10" "." 0°} {} slope, assuming the coefficient of friction for waxed wood on wet snow. (b) Find the angle of the slope down which this skier could coast at a constant velocity. You can neglect air resistance in both parts, and you will find the result of [link] to be useful. Explicitly show how you follow the steps in the Problem-Solving Strategies .

If an object is to rest on an incline without slipping, then friction must equal the component of the weight of the object parallel to the incline. This requires greater and greater friction for steeper slopes. Show that the maximum angle of an incline above the horizontal for which an object will not slide down is θ = tan –1 μ s . You may use the result of the previous problem. Assume that a = 0 and that static friction has reached its maximum value.

Calculate the maximum deceleration of a car that is heading down a size 12{6°} {} slope (one that makes an angle of size 12{6°} {} with the horizontal) under the following road conditions. You may assume that the weight of the car is evenly distributed on all four tires and that the coefficient of static friction is involved—that is, the tires are not allowed to slip during the deceleration. (Ignore rolling.) Calculate for a car: (a) On dry concrete. (b) On wet concrete. (c) On ice, assuming that μ s = 0 . 100 size 12{μ rSub { size 8{s} } =0 "." "100"} {} , the same as for shoes on ice.

Calculate the maximum acceleration of a car that is heading up a slope (one that makes an angle of with the horizontal) under the following road conditions. Assume that only half the weight of the car is supported by the two drive wheels and that the coefficient of static friction is involved—that is, the tires are not allowed to slip during the acceleration. (Ignore rolling.) (a) On dry concrete. (b) On wet concrete. (c) On ice, assuming that μ s = 0.100 , the same as for shoes on ice.

(a) 4 . 20 m/s 2 size 12{4 "." "20 m/s" rSup { size 8{2} } } {}

(b) 2 . 74 m/s 2 size 12{2 "." "74 m/s" rSup { size 8{2} } } {}

(c) –0 . 195 m/s 2 size 12{"-0" "." "195 m/s" rSup { size 8{2} } } {}

Repeat [link] for a car with four-wheel drive.

A freight train consists of two 8 . 00 × 10 5 -kg size 12{8 "." "00" times "10" rSup { size 8{5} } "-kg"} {} engines and 45 cars with average masses of 5 . 50 × 10 5 kg size 12{5 "." "50" times "10" rSup { size 8{5} } " kg"} {} . (a) What force must each engine exert backward on the track to accelerate the train at a rate of 5 . 00 × 10 2 m / s 2 size 12{5 "." "00" times "10" rSup { size 8{ - 2} } m/s rSup { size 8{2} } } {} if the force of friction is 7 . 50 × 10 5 N size 12{7 "." "50" times "10" rSup { size 8{5} } N} {} , assuming the engines exert identical forces? This is not a large frictional force for such a massive system. Rolling friction for trains is small, and consequently trains are very energy-efficient transportation systems. (b) What is the magnitude of the force in the coupling between the 37th and 38th cars (this is the force each exerts on the other), assuming all cars have the same mass and that friction is evenly distributed among all of the cars and engines?

(a) 1 . 03 × 10 6 N size 12{8 "." "91" times "10" rSup { size 8{5} } `N} {}

(b) 3 . 48 × 10 5 N size 12{2 "." "98" times "10" rSup { size 8{5} } `N} {}

Consider the 52.0-kg mountain climber in [link] . (a) Find the tension in the rope and the force that the mountain climber must exert with her feet on the vertical rock face to remain stationary. Assume that the force is exerted parallel to her legs. Also, assume negligible force exerted by her arms. (b) What is the minimum coefficient of friction between her shoes and the cliff?

A mountain climber with a mass of fifty two kilograms exerts force with her feet parallel to her legs on a vertical rock face to remain stationary. The angle between her legs and the rock face is fifteen degrees, whereas the angle between the rope and the cliff is thirty one degrees.
Part of the climber’s weight is supported by her rope and part by friction between her feet and the rock face.

A contestant in a winter sporting event pushes a 45.0-kg block of ice across a frozen lake as shown in [link] (a). (a) Calculate the minimum force F he must exert to get the block moving. (b) What is the magnitude of its acceleration once it starts to move, if that force is maintained?

(a) 51 . 0 N size 12{"51" "." 0`N} {}

(b) 0 . 720 m /s 2 size 12{0 "." "720"`"m/s" rSup { size 8{2} } } {}

Repeat [link] with the contestant pulling the block of ice with a rope over his shoulder at the same angle above the horizontal as shown in [link] (b).

(a) A block of ice is being pushed by a contestant in a winter sporting event across a frozen lake at an angle of twenty five degrees. (b) A block of ice is being pulled by a contestant in a winter sporting event across a frozen lake at an angle of twenty five degrees.
Which method of sliding a block of ice requires less force—(a) pushing or (b) pulling at the same angle above the horizontal?
Practice Key Terms 5

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Source:  OpenStax, College physics: physics of california. OpenStax CNX. Sep 30, 2013 Download for free at http://legacy.cnx.org/content/col11577/1.1
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