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answer
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watching
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8 Jul 2020
Calculate for the enthalpy of formation of the salt using the diagram below.
![](data:image/png;base64,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)
Calculate for the enthalpy of formation of the salt using the diagram below.
24 Jul 2020
Calculate for the enthalpy of formation of the salt using the diagram below.