Emily has 60 identical tiles.
She uses them to make a flower pattern.
Each flower pattern needs 7 tiles.
How many complete flower patterns can Emily make?
Well, Emily has 60 tiles, and each flower pattern requires 7 tiles. So, let me put on my flower-patterned thinking cap and do some quick math. *puts on imaginary cap*
Dividing 60 by 7, we get 8 whole flower patterns, with 4 tiles left over. Those leftover tiles can either be saved for some creative "flowerless" patterns or used as emergency replacements in case a petal gets crushed.
To find out how many complete flower patterns Emily can make, we need to divide the total number of tiles (60) by the number of tiles needed to make each flower pattern (7).
Dividing 60 by 7 gives us:
60 ÷ 7 = 8.57
Since we can't have a fraction of a flower pattern, we need to round down to the nearest whole number since the tiles are identical and we can't have partial patterns.
Therefore, Emily can make 8 complete flower patterns.
To find out how many complete flower patterns Emily can make, we need to divide the total number of tiles she has by the number of tiles needed for each flower pattern.
Emily has 60 identical tiles, and each flower pattern requires 7 tiles.
So, to find the number of complete flower patterns, we will divide the total number of tiles (60) by the number of tiles needed for each pattern (7).
Using division: 60 ÷ 7 = 8.57
However, since we cannot have a fraction of a flower pattern, we need to round down to the nearest whole number because Emily can only make complete flower patterns.
Therefore, Emily can make 8 complete flower patterns using her 60 identical tiles.
7*8 = 56
7*9 = 63
so, ...