4 Force that is applied on the specimen - P (kgf)
Parallel
Perpendicular
0,00E+00
Values measured by the transverse dial gage - Δx 0,00E+00
Values measured by the axial dial gage - Δy 0,00E+00
Values measured by the transverse dial gage – Δx 0,00E+00
Values measured by the axial dial gage - Δy 0,00E+00
5,00E+02
1,50E+01
3,00E+00
8,00E+00
5,00E+01
1,00E+03
4,00E+01
2,10E+01
4,00E+01
8,00E+01
1,50E+03 2,00E+03
5,00E+01 5,50E+01
4,00E+01 5,10E+01
8,00E+01 1,00E+02
1,50E+02 2,30E+02
2,50E+03
6,40E+01
6,10E+01
1,05E+02
3,80E+02
3,00E+03 3,50E+03
7,00E+01 7,50E+01
7,10E+01 8,00E+01
1,23E+02
5,10E+02
4,00E+03 4,50E+03
8,30E+01 8,90E+01
9,00E+01 9,10E+01
5,00E+03
9,30E+01
1,00E+02
5,50E+03
9,70E+01
1,01E+02
6,00E+03
9,80E+01
1,10E+02
6,50E+03 7,00E+03
1,00E+02 1,03E+02
1,20E+02 1,20E+02
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Table 1: Table showing the dial gage measurements corresponding to the force applied for both parallel and perpendicular loading Calculating the Stresses
The following formula formula is going to be used for the calculation of stresses acting on the specimen σ=
P A
where σ is the stress acting on the specimen, P is the force applied on the specimen, A is the area which the load acts upon, A = × where = = = 1,00E-02 m is the length of one side of the specimen which is a unit cube. Calculating the Deformations
In order to compute the deformations on the specimen, the following formulae are going to be used; Dy = Δy × Accuracy of the axial axial gage where D is the axial deformation, deformation, Δy is the value measured by the axial gage, Accuracy of axial the gage is equal to 1,00E-03 inches D = 2 × Δx × Accuracy of the transverse gage