On a groove weld, the bead width should not exceed the width of the groove by more than _____.
a. 1/6 (1.6 mm)
b. 1/8 (3.2 mm)
c. 1/4 (6.4 mm)
d. 3/8 (10 mm)
[Ques. 2] Prior to welding, the base metal should be examined for conditions that may cause weld defects, and the
required dimensions should be _____.
a. smoothed
b. rounded up
c. reduced by 0.003
d. confirmed by measurements
[Ques. 3]
[Ques. 4] Vs8tQ2bbNhk24zZZsx2Y3YYM2IaNd
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 alt= />
The unacceptable fillet weld profile shown in the figure above is an example of _____.
a. excessive undercut
b. overlap
c. an undersized weld
d. excessive convexity"
[Ques. 5] A groove is melted into the base metal beside the weld in the condition called _____.
a. cracking
b. undercut
c. arc strike
d. incomplete fusion