The addition of a strong acid like HCl to an aqueous solution would result in

[NeedAttention]

src="data:image/png;base64,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

Four of the five choices listed below can be used in

describing aspects of fungal reproduction. Select the exception. a. spores b. pollen c. dikaryotic d. gametangia e. asci

Which metabolic process is common to both aerobic cellular respiration and alcoholic fermentation?

(A) Krebs cycle (B) Glycolysis (C) Electron transport chain (D) Conversion of pyruvic acid to acetyl CoA (E) Production of a proton gradient

Researchers have found that an octopus given a clear plastic box with three different types of lids and a crab inside will eventually figure out how to get at least one of the lids open to get the crab. They have also shown that after a new octopus observes a veteran octopus (who already knows how to open the box), the new octopus is able to open the box and always uses the same type of lid that the veteran used. What term best describes these behaviors?

A. innate B. imprinting C. associative learning D. habituation E. cognitive learning