[NeedAttention]
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
Answer: A
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The boiling point of 1,4-butanediol is 230°C. Would you expect this compound to be soluble or insoluble in room-temperature water?
A. Since there are no polar areas on this molecule, it is insoluble in water at room temperature. B. Since there are polar areas on this molecule, it is insoluble in water at room temperature. C. Water would be attracted to both ends of 1,4 butanediol, and it is infinitely soluble in water. D. A high boiling point means that the substance interacts with itself quite strongly. Therefore, this molecule is not soluble in water.
________ are characteristics found in all good aquifers.
a.) Low porosity and low permeability b.) Low permeability and high potability c.) High porosity and high permeability d.) High potability and high portability
Why has Nike (and firms like it) left South Korea?
A) Nike has decided to manufacture its products where they are sold, namely the U.S. B) The government of South Korea has threatened to nationalize private industrial facilities. C) South Korea's economic success has caused labor prices to become too high. D) Because South Korea is threatening to develop nuclear weapons. E) Civil war is making manufacturing in South Korea difficult.
In the hierarchical system of classification, a family can be defined as ________
A) a major subdivision of an order containing one or more genera B) a group of organisms that are very closely related C) a major subdivision of a phylum or a division containing one or more orders D) an overall category containing organisms that share fundamental structures and functions E) a group of individuals that can interbreed with one another