Μάθημα 1- Ισοδύναμα Κλάσματα
Σε μια σχολική εκδήλωση υπήρχαν τρεις πίτσες ίδιου μεγέθους. Κάθε πίτσα[br]ήταν χωρισμένη σε ίσα κομμάτια.[br]• Η Σοφία έφαγε 2 κομμάτια από την πίτσα Α.[br]• Ο Αντρέας έφαγε 3 κομμάτια από την πίτσα Β.[br]• Ο Μιχάλης έφαγε 4 κομμάτια από την πίτσα Γ.[br]• Όλα τα παιδιά έφαγαν την ίδια ακριβώς ποσότητα πίτσας.[br]
Πώς είναι δυνατό να συμβαίνει αυτό; Εξήγησε.
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[/img][br][br][br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Να χρησιμοποιήσεις ράβδους κλασμάτων, για να γράψεις ισοδύναμα κλάσματα με:[br][br][img]data:image/png;base64,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[/img]
Να σημειώσεις τα κλάσματα που είναι ισοδύναμα με το 1/2.
Να εξηγήσεις με ποιο τρόπο θα βρεις ισοδύναμα κλάσματα με τα 8/12 , χωρίς τη χρήση των ράβδων ή του εφαρμογιδίου.
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[/img][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIIAAABJCAYAAADxLP6KAAAH3klEQVR4nO2dWWxU1x2Hv3tn8Yw9M2Y8Nl4BYxtsSAspteywtyi0qtUSKYVGjRpIm9aRkjQtTVAeKhJUUamLSoJKqipRHkoTRQGlDy1BVkOTsgSKQ0ICxIRh9Tp4n8Uez3pvH3AFQVB7Uq7Pred8j2P7/H8+/nTuOefee6zouq4jyXpU0QEk5kCKIAGkCJJxpAgSAKyiA0wXUukoY4lu0LWMfk5RLFhUJzarF6sl16B0EyNF+JyktRg9g3+jP3yI0bFLJNJBnPZyFCWzQVbXNdLaGMlUELdzPj7PMoo8K3Dn1hqU/NYocvmYGYlUkM7+N+gc2MuMvEWUFazD5azBaS/LWIIb0bQEwyMfMBA+Sl/wHfLzFlE36xns1hl3MP3tkSJkQGj0NB9f3kKhZzlzZj5EnqPSkDppLc7FwB8IDLXwhTnb8HmWGlLnRqQIk6R3+G3Odv2au2Y/R1H+yimpOTzyIR9f3sKS6hfx5NYZWkuKMAlGY+287/8BX573R9zOeVNauzf4Dv6u39FY+2fstgLD6sjl4wTousYnHduoKm2ecgkAimesoSh/NVf6/mRoHZOIkKa3p5s3Tlxkr3+IQFJ0nutcHW5BQWVW4XeEZags3kj34F9JpiOG1RC/fBzr54U9R9h6JszI+EXKkV/Klg0reK4uF4vYdPSHDlLuuw9FUYRlcNhLKPKsoGvgTeYWP2xIDbEjghbl9Tf/ydOnw4yiUpCfi9cC8VCAX756iB2BzDZn7jS6nmYwchyfZ5nQHACzih4gMLTfsPaFipDqPc+OU1E0u4/Nj9xPYOsG+n6+lqdnWdFjfew83ENUYL7Q6Gmc9jJybIUCU1zD7ZzPWLwLTTfmuilUBMVeSPO6BnY9sJRn6/KwA1ZPGVtXlZOPTt/VYToFDgpjiYBhewWZoqp2HPZiorFOQ9oXOkew+Mr50Yrymz7VGY2nSAJWh52p2Ve7NWltDIvqFJjgs+TlVBKNt+NyVt3xtsVPFv9DKk53MEp79xV+8fceooqdpkXlFAkcs3Q9haKYp4tUNQdNTxjStml+y1RvG007T3FKA1CY/aV7eKnBZZb17bTHNP2sukt5fO0XeXKRj5mqTueZU/zmQlx0rKzBPCJ4Smheu4SdG5s49M0S3MkgLx24wCWxK8iswTQiXEelpraUOhXivcOcTovOkx0IFSHqP8nXdu1n9evn+PSGP3i4N0SnDordikfchl5WIXSy6CjKRQ30c6h9mActOtuWzMAy1M0LLZe5qitUzKug3jTT2emN0G5WvTVsX3OJ4y19nGw9zn2t179m887lV/eW4RYXL6sQPEewUP/VNby9vo6mChc+m4rL5eEr9Ut467EVPFhgwinMNEX8wKvmUN/YyFuNjaKTZDXiRTAILXKJR185w/sTrToshTzzyFK+687uWem0FQFFxWG3kjehCBZs2e0AYJAIFwbCHPAHjGj6tqyqKmZhyfVbVKqrkt8/Zo47h/8PGCJCdyjKvrPG3C69HXO8eZ8RQZIZhoiwurqE1dUlRjQ9abSRK/xkdxsfTnhp8LF5YwPrXdl9fZi+cwRdIxpLEppQhBRx+UD/9BVBdVfxys/u/AMc0xW5YyMBTDciJDnzyRWORSC/tIL1c5zS1CnCVP2cHjjPk68dpfkvpzmctJkr3DTHRH2d5ujRcxxOQF5lLT+uMtlgNc0xjQha+ArPnwiTUnL59soa5psmWXZgku7WOPOvs+yPgr20hp8uzBEdKOswhwhj3ew8PkRcsdO0spbFol94zEJMcCHWuPxBG3tDOtbCajYvziURCeGPpLHluVmQbxMdMCsQPyIk+9n1Xi8jWFm5vI7ldo1P3ztI/Y59NP1jAPlA+9QgWASd3lNt7B7QUfMr2VzvEf4afLYiVoR0kJePdDGoq9zduIBvmOc1w2soKnqG5yYai45i0J9MqAgR/1le7tJQHKV8f7GT4ZEY/SNxQqlrd4G0VJKhmLgXGxy2YmKJqX2u4r+R1sZQVYchbQucLGr0BoIEdNBi3Tzx2z08cdN3dLS+y9zwUgI/nI9XQEKXo5qR2EUBlW9NIjmEzZpvSNsCRVCwu1zcVZzk5qMfEqMRLoykseW6WOjNETZsOeylpNIRkukINovYB+sTqSDReCce5wJD2hcqwuyGVZxsuPlzjY9a9tFwIEjZ3cs4dn8poraXFEWhwN3I1aEWZhVtEJTiGoPhY3jd9aiqMctp8ctHk1M58yHa+14VPmnsC71LoWe5Ye3LAzcnQeu5h5kz83sUe+8VUn8wfIy2ju0sXbAHqyXPkBpyRJgEVaXN+LufJ5EcmvLaqfQIbR3bWTj7WcMkACnCpCj0LKPMt46PLj+FphlzdM2tiCX6OHH+UWbOWIPPY+ybYFKESVJV0kyuvYLj/k1Eon5Da+m6Tl/oIK3+TZR4v05txVOG1gM5R8iYnsF9+HteoKzgWxR71+JxLrhjp7JqWpLA8H7ae3djUZ3UlD0+JUf0gxThcxFL9tPR9xoD4SMkUkF87nvIsRVhVXMh4//gkiIa72AkdpForBOvewmVMzdR4K43KP2tkSL8j4wlAgxFWkmkhklrY+h6ZlviqmLFaa/A5awmz1Ep7FxHKYIEkJNFyThSBAkgRZCMI0WQAFIEyThSBAkgRZCMI0WQAFIEyThSBAkgRZCMI0WQAFIEyThSBAkA/wY/e5ghWhW7vQAAAABJRU5ErkJggg==[/img][br]Στο πιο πάνω σχήμα να χρωματίσεις στο σχήμα το ισοδύναμο κλάσμα και ακολούθως να το γράψεις γράψεις στην ισοδυναμία.[br][br]
Με βάση τα σχήματα που ακολουθούν να επιλέξεις σε κάθε απάντηση την σωστή ισοδυναμία.
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[/img]
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[/img]
Να χρησιμοποιήσεις τα πιο κάτω πλαίσια, για να βρεις 3 διαφορετικά ισοδύναμα κλάσματα με το 1/4.[br][img]data:image/png;base64,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[/img]
Υπάρχουν και άλλα ισοδύναμα κλάσματα με το 1/4 ; Να εξηγήσεις