Which of the following are true about factors that influence weathering?

The pressure announced on last night's television weather broadcast was 100.6. Explain how this was measured and give the units. Is this considered an unusually high- or low-pressure value?

What will be an ideal response?

How much energy, in kilojoules, is released or absorbed from the reaction of one mole of nitrogen, N2, with three moles of molecular hydrogen, H2, to form two moles of ammonia, NH3? H-N (bond energy: 389 kJ/mol) H-H (bond energy: 436 kJ/mol) N

N (bond energy: 946 kJ/mol) N N + H-H + H-H ? NH3 + NH3 A) +899 kJ/mol absorbed B) -993 kJ/mol released C) +80 kJ/mol absorbed D) -80 kj/mol released

When meander scars are filled with water, they are called

A. river terraces. B. oxbow lakes. C. point bars. D. main channels. E. floodplain.

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