¿De cuántas maneras podrías mover la siguiente figura de manera que al observarla en la posición inicial y en la posición final se superponga con ella misma?[br][img]data:image/png;base64,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[/img]

Verifica tus conjeturas en la ventana anterior. Encuentra una justificación que las sustente y explica qué devolución le harías a estos dos estudiantes.