which statement is true about following pair of rectangles?
they are not simliar because 6/60 = 30
/3
To determine if two rectangles are similar, we compare their corresponding side lengths. Similar rectangles have proportional side lengths.
In the given statement, we have two rectangles for comparison, but there is no specific information about their side lengths. However, a calculation is provided: 6/60 = 30/3.
To find out if this calculation is related to the rectangles, we can try to simplify it. Dividing both the numerator and denominator of 6/60 by 6, we get 1/10. Similarly, dividing the numerator and denominator of 30/3 by 3, we get 10/1.
Now, we have simplified the fraction 6/60 = 30/3 to 1/10 = 10/1.
In terms of the rectangles, if these simplified fractions represent the ratio of corresponding side lengths of the rectangles, then we can conclude that the two rectangles are indeed similar.
However, the statement in question does not provide enough context to definitively determine if the given calculations are connected to the pair of rectangles. Hence, we cannot determine the truth of the statement based on the information provided.