What is the timing of the basin shown in this figure?

Group identities can help determine which groups of people have a connection with; however, it can also produce incorrect assumptions better known as

A) stereotyping. B) individual identities. C) heritage building. D) over identifying.

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

Ray Anderson is noted as a model businessman because he

A. ran a major carpet retailer while following government regulations. B. was an innovator of new carpet design techniques using the latest technology. C. shifted a large company toward sustainable business practices while growing his business. D. acknowledged that growing his business was secondary to practicing sustainability. E. lobbied effectively for government carpet square subsidies.

The boiling point of methanol is 65°C, and the boiling point of ethanol is 78°C. Which of the following statements is true?

A. At 40°C, the methanol reacts with the ethanol. B. At 70°C, you would have methanol gas and liquid ethanol. C. At 50°C, you would have methanol and ethanol as gases. D. At 90°C, you would have methanol and ethanol as solids. E. none of the above