1.Μετακινήστε τον δρομέα. Τι παρατηρείτε;

2. Να βρείτε την τιμή του χ στο πιο κάτω σχήμα, δικαιολογώντας την απάντηση σας.[br][img]data:image/png;base64,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[/img]