The ratio of the corresponding side of two similar triangle is 3:4. The ratio of thief area?
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GIVEN : The ratio of corresponding sides of two similar triangle is 3:4
AS WE KNOW THAT , If two triangles are similar ,then the ratio of the area of the both the triangles is proportional to square of the ratio of the ratio of their respective corresponding sides ....
NOW, Let us consider two similar triangles ABC and PQR and the corresponding sides be AB and PQ
Area of triangle ABC / Area (PQR)= (AB/PQ)^2
= (3/4)^2
= 9/ 16
SO, The ratio of their area 9:16 ,✔
___________________________⭐⭐⭐
HOPE IT HELPS U✌✌
^_^
_________________________⭐⭐⭐
GIVEN : The ratio of corresponding sides of two similar triangle is 3:4
AS WE KNOW THAT , If two triangles are similar ,then the ratio of the area of the both the triangles is proportional to square of the ratio of the ratio of their respective corresponding sides ....
NOW, Let us consider two similar triangles ABC and PQR and the corresponding sides be AB and PQ
Area of triangle ABC / Area (PQR)= (AB/PQ)^2
= (3/4)^2
= 9/ 16
SO, The ratio of their area 9:16 ,✔
___________________________⭐⭐⭐
HOPE IT HELPS U✌✌
^_^
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