Answer:
critical stress [tex]\sigma c[/tex] = 1382.67 MPa
fracture will not be occure
Explanation:
given data
plane strain fracture toughness = 54.8 MPa
length of surface creak = 0.5 mm
Y = 1.0
solution
we apply here critical stress formula that is
critical stress [tex]\sigma c = \frac{K}{Y\sqrt{\pi * a} }[/tex] .............................1
here K is design stress plane strain fracture toughness and a is length of surface creak so put all these value in equation 1
critical stress [tex]\sigma c = \frac{54.8 * 10^6}{1 \sqrt{\pi * 5 * 106{-4}}}[/tex]
critical stress [tex]\sigma c[/tex] = 1382.67 MPa
here we can say that exposed stress 1030 MPa is less than critical stress 1382 MPa so that fracture will not be occure
