Question about friction and normal force

AI Thread Summary
The discussion centers on calculating the normal force for a block being pushed along a horizontal surface. The normal force is derived using the equation N = mg + Fsin(theta), where the angle is given as 40 degrees downward. There is confusion about why the angle is not considered negative since it is directed downward in the fourth quadrant. It is clarified that using the positive angle accounts for the downward direction, as the sine function inherently considers the direction of the force. The correct approach confirms that the normal force calculation remains valid regardless of the angle's sign.
Supernejihh
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Homework Statement



A 3.5 kg block is pushed along a horizontal floor by a force F of magnitude 15 N at an angle of 40 degrees DOWNWARD. The coefficient of kinetic friction between the block and the floor is 0.25.

My question is about the normal force. I know the normal force is given by:

N - mg - Fsin(theta) = 0.

N = mg + Fsin(theta)

The correct normal force they obtain in the problem is from (3.5)(9.8) + 15sin(40)

I am wondering why they chose the angle as 40 when it was directed down into the 4th quadrant. Why isn't the angle then -40 degrees (negative 40 degrees) because it is in the 4th quadrant, below the horizontal.

Picture: http://www.google.com/imgres?q=a+3....=rc&dur=655&sig=111188412953169759186&page=1&

Homework Equations



N = mg + Fsin(theta)


The Attempt at a Solution



(3.5)(9.8) + 15sin(40)
and
(3.5)(9.8) + 15sin(-40)
 
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When you choose "-" sign for the third term (first equation of your post) you already took into account the fact that the force is downwards, the angle is in the fourth quadrant etc.
 
Thanks nasu. Much appreciated
 

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