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A 2.60 kg mass is being pulled by a force of 19.6 N at an angle of elevation of 35.0° as shown in the diagram below. The coefficient of friction between the floor and the block is 0.270. If the block starts from rest, what is its speed after being pulled with this force for 11.0 s? Hint: find the net acceleration first. (23 marks) m = 2.60 kg q app = 35.0° m = 0.270 q incl = 0° g = 9.81 m s2 Fapp = 19.6 N t = 11.0 s vi = 0 m s vf = ? In order to solve the acceleration question, one must follow these steps: 1. Draw a free-body diagram. 2. Find the x- and y-components of the applied force vector. 3. Find the net force in the y-direction by adding the applied force in the ydirection to the weight if it’s being pushed and subtract the applied force in the y-direction if it’s being pulled. 4. Use the net force in the y-direction to calculate the force of friction. 5. Calculate the net force in the x-direction by subtracting the frictional force from the applied force in the x-direction. 6. Calculate the net acceleration by dividing the net force in the x-direction by the mass of the block. 7. Calculate final velocity using kinematics equations. To understand what is happening in this problem, one must first construct a free-body diagram to describe the forces involved. Fapp is the applied force acting on the mass. Fappx is the component of the applied force acting in the Fapp Fappy Ff Fappx Fg x-direction. Fappy is the component of the applied force acting in the y-direction. Fg is the force of gravity (weight) acting on the mass. Ff is the force of friction acting on the mass. Fappy Fapp = sinq In order to solve for the final speed of the block, we must first break down the applied force into its xF and y- components. app Fappy Fappy = Fapp sinq Fappy =19.6 N sin35.0° Fappy =11.2 N Because this block is being pulled, the force acting in the y-direction is an upward force as seen here. If the block were being pushed, the force in the ydirection would be a downward force and it would add to the weight of the object being pushed. Fappy Fapp Fappx Fapp = cosq There is a component of the applied force that acts in the direction of motion, or the x-direction. We calculate this force by using the cos function. Fapp Fappx = Fapp cosq Fappx =19.6 N cos35.0° Fappy =16.1 N Fappx This component in the x-direction will be opposed by the force of friction. However, what must first be found is the net force acting in the y-direction. It is necessary for us to calculate the effective weight (net force acting in the y-direction) of the block, given the fact that it has its own weight MINUS the component of the pulling force that we have applied. Fapp Fappy Ff Fappx Fg The effective weight is increased when we are pushing because we are adding to the weight, but it is decreased when we are pulling the mass because we out y-component applies a lifting force to the mass. Fnety = Fg + Fappy It is necessary for us to calculate the effective weight (net force acting in the y-direction) of the block, given the fact that it has its own weight MINUS the component of the pulling force that we have applied. Fnety = Fg - Fappy Fnety = m g - Fappy Fnety = ( 2.60 kg) ( 9.81m / s 2 ) -11.2 N Fnety = 25.5 N -11.2 N Fnety =14.3N Fappy Fg Fnety The effective weight is increased when we are pushing because we are adding to the weight, but it is decreased when we are pulling the mass because we out y-component applies a lifting force to the mass. Once you have calculated the net force in the y-direction, you can then calculate the net force acting in the x-direction because the net force in the y-direction is needed to calculate the force of friction. One must finally calculate the net acceleration of the block using Newton’s 2nd Law. Fapp Fappy Ff Fappx F netx = F appx + F f Fnetx = Fappx - Ff m anetx = Fappx - m m g cosq incl Once you have calculated the net force in the y-direction, you can then calculate the net force acting in the x-direction because the net force in the y-direction is needed to calculate the force of friction. Fappx - m m gcosqincl anetx = m 16.1N - ( 0.270) ( 2.60kg) 9.81 m 2 s anetx = ( 2.60kg) ( anetx = 3.54 m One must finally calculate the net acceleration of the block using Newton’s 2nd Law. ) cos0° s2 Fappx Ff Fnetx Dv anetx = Dt v f = vi + anetx Dt ( At this point the question merely becomes a kinematic question. We solve for the final velocity beginning with the definition of acceleration. ) v f = 0 m + 3.54 m 2 (11.0s) s s v f = 38.9 m s Fapp