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Write the ratio of corresponding sides for the similar triangles and reduce the ratio to lowest terms.
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Write the ratio of corresponding sides for the similar triangles and reduce the ratio to lowest terms.

Write the ratio of corresponding sides for the similar triangles and reduce the ratio-example-1
User Heli Shah
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1 Answer

1 vote

Option A


(12)/(36) = (13)/(39) = (1)/(3) is the the ratio of corresponding sides for the similar triangles

Solution:

We have to write the ratio of corresponding sides for the similar triangles

When two figures are similar, the ratios of the lengths of their corresponding sides are equal.

The given figure in question is attached below with sides marked as ABC for bigger triangle and XYZ for smaller triangle

Therefore,


(XY)/(AC) = (YZ)/(CB)

In the attached figure,

XY = 12

AC = 36

YZ = 13

CB = 39

Substituting these we get,


(12)/(36) = (13)/(39)

Reducing to lowest terms we get,


(12)/(36) = (13)/(39) = (1)/(3)

[ 36 divided by 12 is 3 and 39 divided by 13 is 3 ]

Thus Option A is correct

Write the ratio of corresponding sides for the similar triangles and reduce the ratio-example-1
User Russel Crowe
by
4.0k points
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