Χρησιμοποιήστε τις κλίμακες και τα σχέδια κλίμακας για να προσεγγίσετε το πραγματικό μήκος του ανοίγματος των φτερών του αεροπλάνου, στο πλησιέστερο πόδι ft.

Χρησιμοποιήστε τις κλίμακες και τα σχέδια κλίμακας για να προσεγγίσετε το πραγματικό μήκος του ύψους του επιπέδου, στο πλησιέστερο πόδι.[br]Use the scales and scale drawings to approximate the actual length of the height of the plane, to the nearest foot.

Χρησιμοποιήστε τις κλίμακες και τα σχέδια κλίμακας για να προσεγγίσετε το πραγματικό μήκος του μήκους του Lysander Mk. Εγώ, στο πλησιέστερο μέτρο.[br]Use the scales and scale drawings to approximate the actual length of the length of the Lysander Mk. I, to the nearest meter.

Ένα σχέδιο για ένα κτίριο περιλαμβάνει ένα ορθογώνιο δωμάτιο που έχει μήκος 3 ίντσες και πλάτος 5,5 ίντσες. Η κλίμακα για το σχέδιο λέει ότι 1 ίντσα στο σχεδιάγραμμα ισοδυναμεί με 10 πόδια στο πραγματικό κτίριο.[br]Ποιες είναι οι διαστάσεις αυτού του ορθογώνιου δωματίου στο πραγματικό κτίριο;[br]A blueprint for a building includes a rectangular room that measures 3 inches long and 5.5 inches wide. The scale for the blueprint says that 1 inch on the blueprint is equivalent to 10 feet in the actual building. [br]What are the dimensions of this rectangular room in the actual building?

Η κλίμακα εμφανίζεται στην κάτω αριστερή γωνία. Βρείτε τα πραγματικά μήκη πλευρών της πλατείας Λαφαγιέτ σε πόδια.

Χρησιμοποιήστε τον χάρακα ίντσας για να μετρήσετε το τμήμα γραμμής της κλίμακας γραφικών. Πόσα πόδια αντιπροσωπεύει περίπου μια ίντσα σε αυτόν τον χάρτη;[br]Use the inch ruler to measure the line segment of the graphic scale. About how many feet does one inch represent on this map?

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[/img][br]Πόσες φορές μεγαλύτερο είναι το εμβαδόν του κλιμακούμενου αντιγράφου σε σύγκριση με αυτό του Τριγώνου Α;[br]How many times larger is the area of of the scaled copy compared to that of Triangle A?

Τι συντελεστή κλίμακας εφάρμοστηκε στο Τρίγωνο Α για να δημιουργήθει το αντίγραφο;[br]What scale factor did Lin apply to the Triangle A to create the copy?

Ποιο είναι το μήκος της κάτω πλευράς του κλιμακούμενου αντιγράφου;[br]What is the length of bottom side of the scaled copy?