[img]data:image/png;base64,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[/img][br][br]What is the measure of angle EAD?[br]What is the measure of angle EAB?
[img]data:image/png;base64,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[/img][br]What is the measure of angle HEI?[br]What is the measure of angle IEF?[br]What is the measure of angle HEG?