The igneous feature shown in this figure is a

What could happen if global warming were to continue?

a. Changes in global winds and rainfall b. Rise in ocean temperatures c. Decrease in dissolved gases d. All of these choices

The scientific name of an organism includes the genus and species name

Indicate whether the statement is true or false

Which of the following solutions will require the most NaOH in a titration experiment?

A) 25 mL of 0.5 M HCl B) 25 mL of 0.5 M HCOOH C) 25 mL of 0.5 M HC2H3O2 D) They all require the same amount.

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