Answer:
maximum stress is 2872.28 MPa
Explanation:
given data
radius of curvature = 3 × [tex]10^{-4}[/tex] mm
crack length = 5.5 × [tex]10^{-2}[/tex] mm
tensile stress = 150 MPa
to find out
maximum stress
solution
we know that maximum stress formula that is express as
[tex]\sigma m = 2 ( \sigma o ) \sqrt{\frac{a}{\delta t}}[/tex] ......................1
here σo is applied stress and a is half of internal crack and t is radius of curvature of tip of internal crack
so put here all value in equation 1 we get
[tex]\sigma m = 2 ( \sigma o) \sqrt{\frac{a}{\delta t}}[/tex]
[tex]\sigma m = 2(150) \sqrt{ \frac{\frac{5.5*10^{-2}}{2}}{3*10^{-4}}}[/tex]
σm = 2872.28 MPa
so maximum stress is 2872.28 MPa
