Which of the following happened to form the features in this region?

Which equation best describes the reaction represented in the illustration above?

A) 2 AB2 + 2 DCB3 + B2 ? 2 DBA4 + 2 CA2 B) 2 AB2 + 2 CDA3 + B2 ? 2 C2A4 + 2 DBA C) 2 AB2 + 2 CDA3 + A2 ? 2 DBA4 + 2 CA2 D) 2 BA2 + 2 CDA3 + A2 ? 2 DBA4 + 2 CA2

A glacial landform that forms at the head of glacial valleys or troughs is called a(n) ____

A)roche moutonée B)esker C)kame D)arête E)cirque

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

It has been said that recycling has grown too fast in the United States. Explain

What will be an ideal response?