What device may have a rotating table surface and/or spikes on the table surface for a better grip?
A) Roller skid
B) Pallet jack
C) Pallet conveyor
D) Accumulating conveyor
[Ques. 2] To transport a bottle of compressed gas, use a _____.
A) hand truck
B) cylinder cart
C) wheelbarrow
D) tunnel buggy
[Ques. 3] One common way to tie a clove hitch is to use two _____.
A) slip knots
B) half hitches
C) square knots
D) bowlines
[Ques. 4] 
[Ques. 5] 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 alt= />
The knot shown in the figure above is a _____.
A) square knot
B) clove hitch
C) half hitch
D) bowline"
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