Which of the following best describes green economies compared to brown economies?

A) Green economies will embrace technologies that reduce pollutants and increase efficiency.
B) Brown economies will favor sustainable systems and reverse damage to ecosystem services.
C) Both will continue with the race to develop more fossil fuel resources.
D) Green economies will stress rapid growth, while brown economies will stress human well-being.


A

Environmental & Atmospheric Sciences

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In addition to sand moving along shore, how is beach sand permanently lost to the beach system?

What will be an ideal response?

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

Environmental & Atmospheric Sciences

To study past climates, scientists use direct measurements

Indicate whether the statement is true or false

Environmental & Atmospheric Sciences