In terms of dating of specific rocks, structures, or landscapes, absolute age refers to
A) a range of numeric values in which features were likely formed and based on several lines of evidence, such as paleoclimatic and paleobotanical reconstructions.
B) the age of one feature with respect to another within a sequence of events and deduced from the positions of rock strata above and below one another.
C) the age of geological features based on radiometric dating techniques.
D) the approximate age of geological features based on the period or epoch in which they occurred. For instance, noting a feature is from the Cretaceous.
E) historical records from the earliest modern humans that recorded when the rocks and structures were formed.
C
You might also like to view...
Has the rate of movement of the Pacific plate been constant over the lifetime of the Hawaiian-Emperor island chain? Which section has been moving faster?
What will be an ideal response?
With their One-Child Policy, China hopes to stabilize their population at 1.5 billion around the year 2025
Indicate whether the statement is true or false
[NeedAttention]
src="data:image/png;base64,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
The Fifth Assessment Report of the Intergovernmental Panel on Climate Change
a. was produced by a group that includes hundreds of scientists and government representatives. b. summarizes thousands of scientific studies related to climate change and its impacts. c. offers strategies to counteract the impacts of climate change on wildlife, ecosystems, and society. d. All of the above are true about this report.