Answer:
(a) 0.1509 mm
(b) 0.00525 mm
Explanation:
Stress, [tex]\sigma[/tex] is given by
[tex]\sigma=\frac {F}{A}[/tex] where F is force and A is area and area is given by [tex]\frac {\pi d^{2}}{4}[/tex] hence
[tex]\sigma=\frac {4F}{\pi d^{2}}[/tex] where d is the diameter. Substituting 9970 N for F and 10mm=0.01 m for d hence
[tex]\sigma=\frac {4*9970 N}{\pi 0.01m^{2}}=126941982.6 N/m^{2}[/tex]
[tex]\sigma \approx 127 Mpa[/tex]
From the attached stress-strain diagram, the stress of 127 Mpa corresponds to strain of 0.0015 and since strain is given by
[tex]\epsilon=\frac {\triangle l}{l}[/tex] where[tex] \epsilon[/tex] is the strain, [tex]\triangle l[/tex] is elongation and l is original length and making elongation the subject
[tex]\triangle l= \epsilon \times l[/tex] and substituting strain with 0.0015 and length l with 100.6 mm then
[tex]\triangle l=0.0015\times 100.6=0.1509 mm[/tex]
(b)
Lateral strain is given by
[tex]\epsilon_{lat}=\frac {\triangle d}{d}[/tex] and substituting [tex]-v\epsilon[/tex] for [tex]\epsilon_{lat}[/tex] where v is poisson ratio then
[tex]-v\epsilon=\frac {\triangle d}{d}[/tex] and making [tex]\triangle d[/tex] the subject then
[tex]\triangle d=-vd\epsilon[/tex] and substituting 0.35 for v, 0.0015 for strain and 10 mm for d
[tex]\triangle d=-(0.35)*10*0.0015=-0.00525 mm[/tex] and the negative sign indicates decrease in diameter
