How to find if parallelograms are similar - Geometry
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A parallelogram has adjacent sides with the lengths of 
and 
. Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The solution is:
, (divide both numbers by the common divisor of 
).
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The solution is:
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of 
and 
. Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of a similar parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of a similar parallelogram.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of 
and 
. Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of 
and 
. Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The solution is:
, (divide both numbers by the common divisor of ).
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The solution is:
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of a similar parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of a similar parallelogram.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The solution is:
, (divide both numbers by the common divisor of ).
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The solution is:
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of a similar parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of a similar parallelogram.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The solution is:
, (divide both numbers by the common divisor of ).
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The solution is:
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of a similar parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of a similar parallelogram.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Applying this ratio we are able to find the lengths of the second parallelogram.
Compare your answer with the correct one above
A parallelogram has adjacent sides with the lengths of and . Find a pair of possible adjacent side lengths for a similar parallelogram.
A parallelogram has adjacent sides with the lengths of
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Since the two parallelogram are similar, each of the corresponding sides must have the same ratio.
The ratio of the first parallelogram is:
Thus by simplifying the ratio we can see the lengths of the similar triangle.
Compare your answer with the correct one above