Question 10.1: (a) Two parallel steel cylinders of radii 50mm and lOOmm are...

For contacting parallel cylinders eqn. (10.9) gives the value of the maximum contact pressure (or compressive stress) as

\sigma _{c}=-p_{0} =-0.591\sqrt{\frac{P}{L\Delta } (\frac{1}{R_{1}}+\frac{1}{R_{2}} )}          (10.9)

where

\Delta =\frac{1}{E_{1}} [1-\nu ^{2}_{1} ]+\frac{1}{E_{2}} [1-\nu ^{2}_{2} ]
=\frac{2}{E} [1-\nu ^{2} ] for similar materials
=\frac{2\times 0.91}{208\times 10^{9}}

Max. contact pressure

p_{0}=0.591\sqrt{\frac{2\times 10^{3}\times 208\times 10^{9}}{150\times 10^{-3}\times 2\times 0.91}(\frac{1}{50}+\frac{1}{100} )10^{3}}
=0.591\times 21.38\times 10^{7}
=126.4  MN/m^{2}
Maximum shear stress =0.295 p_{0}=37.3  MN/m^{2}
occurring at a depth  d=0.786 b

with (from eqn. (10.8))

b=1.076\sqrt{\frac{P\Delta }{L(\frac{1}{R_{1}}+\frac{1}{R_{2}})} }          (10.8)
=1.076\sqrt{\frac{2\times 10^{3}\times 2\times 0.91}{150\times 10^{-3}208\times 10^{9}\times 30} }
=1.076\times 0.624\times 10^{-4}
=0.067  mm
Depth of max shear stress  =0.786\times 0.067=0.053  mm

(b) Replacing the 100 mm cylinder by a flat surface makes \frac{1}{R_{2}}=0 and

contact pressure  p_{0}=0.591\sqrt{\frac{2\times 10^{3}\times 208\times 10^{9}}{150\times 10^{-3}\times 2\times 0.91}(\frac{1}{50} )10^{3}}
=0.591\times 17.48\times 10^{7}
=103.2  MN/m^{2}

with max shear stress  =0.295\times 103.2=30.4 MN/n^{2}
and  b=0.082  mm
Depth of max shear stress =0.786\times 0.082=0.064  mm