Engineering Mechanics

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Chapter 30 : Work, Power and Energy „„„„„ 619


Now substituting the value of (v^2 = 2gh) in the above equation,

(^22)
()
2( )
mgh
E mMgx
mM
×
=++



  • 2
    ()
    ()
    mgh
    mMgx
    mM
    =++

  • ...(iv)
    We know that work done by the soil resistance
    = Rx ...(v)
    Since the total energy of the hammer and pile is used in the work done by the soil resistance,
    therefore equating equations (iv) and (v),
    2
    ()
    ()
    mgh
    mMgxRx
    mM
    =++=



  • 2
    ()
    ()
    mgh
    R mMg
    xm M
    =++




  • Note. Sometimes the pile is of negligible mass. In such cases, the soil resistance,
    2
    1
    mgh h
    Rmgmg
    xm x
    ⎛⎞
    =+= +⎜⎟
    ⎝⎠
    Example. 30.20. A pile of negligible mass is driven by a hammer of mass 200 kg. If the pile
    is driven 500 mm into the ground, when the hammer falls from a height of 4 metres, find the average
    force of resistance of the ground.
    Solution. Given : Mass of hammer (m) = 200 kg ; Distance through which the pile is driven
    into ground (x) = 500 mm = 0.5 m and the height through which hammer falls (h) = 4 m
    We know that average force of resistance of the ground,
    4
    1 200 9.8 1 1960 9 N
    0.5
    h
    Rmg
    x
    ⎛⎞ ⎛ ⎞
    =+=× +=×⎜⎟ ⎜ ⎟
    ⎝⎠ ⎝ ⎠
    = 17 640 N = 17.64 kN Ans.
    Example 30.21. A hammer of mass 0.5 kg hits a nail of 25 g with a velocity of 5 m/s and
    drives it into a fixed wooden block by 25 mm. Find the resistance offered by the wooden block.
    Solution. Given : Mass of hammer (m) = 0.5 kg ; Mass of nail (M) = 25 g = 0.025 kg ; Velocity
    of hammer (v) = 5 m/s and distance through which nail is driven into wooden block
    (x) = 25 mm = 0.025 m.
    Let h = Height through which the pile hammer
    fell before striking the pile.
    We know that velocity of hammer (v),
    5 ==×= 2 gh 2 9.8h 19.6h

    (5)^225
    1.28 m
    19.6 19.6
    h===
    and resistance offered by the wooden block,
    2
    ()
    ()
    mgh
    R mMg
    xm M
    =++




  • (0.5)^2 9.8 1.28
    (0.5 0.025) 9.8 N
    0.025 (0.5 0.025)
    ××
    =++




  • = 238.9 + 5.1 = 244 N Ans.
    Fig. 30.12.



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