Canada's population reached 30 million by the year 2000

Active margins tend to be narrow in comparison to broad passive margins

Indicate whether the statement is true or false

Rotation time is ________

A) intended use of wood B) intensively managing forests for human benefit C) intensively managing forests for plant and animal benefit D) the average interval between types of forests: evergreen or deciduous E) the average interval between successive cuts

How does the burning of fossil fuels affect the environment?

A) Greenhouse gases are released that raise global temperatures. B) Sulfur dioxide is produced, which contributes to acid rain. C) Particulates are released into the atmosphere, which collect on ice caps and glaciers to absorb more heat. D) Increased carbon dioxide in the atmosphere leads to ocean acidification. E) All of the above.

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