The ____ dimension of a slot weld is located to the left of the symbol.

Domestic uses account for about ____ percent of U.S. water use

A) 45 B) 13 C) 42 D) 24

The ____________________ of fish may have begun when people caught more fish than they could eat and needed a way to store them

Fill in the blank(s) with correct word

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

A dimension line is drawn at right angles between _____

a. object lines b. extension lines c. center lines d. leader lines