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8 Jul 2020
Using the diagram of a Born-Haber cycle shown below, identify which represents the electron affinity of bromine.
![](data:image/png;base64,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)
Using the diagram of a Born-Haber cycle shown below, identify which represents the electron affinity of bromine.
24 Jul 2020