1
answer
2
watching
896
views
6 Apr 2020
The reaction A2 + B2
2 AB has an equilibrium constant Kc = 1.5. The following diagrams represent reaction mixtures containing A2 molecules (red), B2 molecules (blue), and AB molecules. (a) Which reaction mixture is at equilibrium? (b) For those mixtures that are not at equilibrium, how will the reaction proceed to reach equilibrium?
![](data:image/png;base64,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)
The reaction A2 + B2 2 AB has an equilibrium constant Kc = 1.5. The following diagrams represent reaction mixtures containing A2 molecules (red), B2 molecules (blue), and AB molecules. (a) Which reaction mixture is at equilibrium? (b) For those mixtures that are not at equilibrium, how will the reaction proceed to reach equilibrium?
Keith LeannonLv2
23 May 2020