The extinction event at the end of the Permian affected only land-dwelling organisms

The ____________ visited North America 500 years prior to the arrival of Columbus. What will be an ideal response?

[NeedAttention]

src="data:image/png;base64,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

Abyssal clay is an example of which of the following sediment types?

A) Biogenous Sediment B) Cosmogenous Sediment C) Hydrogenous Sediment D) Lithogenous Sediment

Judge the following sentence according to the criteria given below: Atmospheric pressure decreases with increasing altitude BECAUSE it depends on the weight of the column of air above

A) The assertion and the reason are both correct, and the reason is valid. B) The assertion and the reason are both correct, but the reason is invalid. C) The assertion is correct, but the reason is incorrect. D) The assertion is incorrect, but the reason is correct. E) Both the assertion and the reason are incorrect.