The impulse-momentum relationship Ft = change in mv, applies to a fast-moving baseball hitting a bat with a force F. Then m in the equation is the

Sustainable management and harvesting of forests is certified by the

a. U.S. Forest Service b. California Conservation Core c. Forest Stewardship Council d. Convention on International Trade of Endangered Species e. Endangered Species Act

When supercooled raindrops freeze on contact with solid objects, ________ forms.

rime glaze hail sleet

What is standard sea level pressure in millibars, in inches of mercury, and in pounds per square inch?

What will be an ideal response?

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