FRICTION 175plane is so much smaller than to move the body up
the plane.
15.7 Motion up a plane due to a
horizontal forceP
This motion, together with the primary forces, is
shown in Figure 15.8.
In this, the components of mg are as shown in
Figure 15.4, and the components of the horizon-
tal forceP are shown by the vector diagram of
Figure 15.9.
qqMotionNPFmgFigure 15.8
qq
q
P sinq
P cosqPPlaneFigure 15.9
Resolving perpendicular to the plane gives:
Forces ‘up’ =forces ‘down’
i.e. N=mgcosθ+Psinθ( 15. 11 )
Resolving parallel to the plane gives:
Pcosθ=F+mgsinθ( 15. 12 )and F=μN ( 15. 13 )
From equations (15.11) to (15.13), problems arising
in this category can be solved.
Problem 9. If the mass of Problem 7 were
subjected to a horizontal forceP, as shownin Figure 15.8, determine the value ofP that
will just cause motion up the plane.Substituting equation (15.13) into equation (12)
gives:Pcosθ=μN+mgsinθor μN=Pcosθ−mgsinθi.e. N=Pcosθ
μ−mgsinθ
μ( 15. 14 )Equating equation (15.11) and equation (15.14)
gives:mgcosθ+Psinθ=Pcosθ
μ−mgsinθ
μi.e. 25× 9 .81 cos 15°+Psin 15°=Pcos 15°
0. 3−25 × 9 .81 sin 15°
0. 3
245. 3 × 0. 966 +P× 0. 259=P× 0. 966
0. 3−245. 3 × 0. 259
0. 3i.e. 237 + 0. 259 P= 3. 22 P− 211. 8237 + 211. 8 = 3. 22 P− 0. 259 Pfrom which, 448. 8 = 2. 961 Pand forceP=448. 8
2. 961= 151 .6NProblem 10. If the mass of Problem 9 were
subjected to a horizontal forceP, acting
down the plane, as shown in Figure 15.10,
determine the value ofPwhich will just
cause motion down the plane.qqNP FmgMotionFigure 15.10