if area of two similar triangles are 121:100 then ratio of there corresponding sides About the author Kinsley
Answer: The ratio of their corresponding sides is 11:10 Step-by-step explanation: Since we have given that Ratio of two similar triangles = 121:100 So, we need to find the corresponding sides. As we know the “Area similarity theorem”: So, it becomes. 121/100 = a^2/b^2 11^2/10^2 = a^2/b^2 a/b = 11/10 Hence, the ratio of their corresponding sides are 11:10 Reply
Answer:
The ratio of their corresponding sides is 11:10
Step-by-step explanation:
Since we have given that
Ratio of two similar triangles = 121:100
So, we need to find the corresponding sides.
As we know the “Area similarity theorem”:
So, it becomes.
121/100 = a^2/b^2
11^2/10^2 = a^2/b^2
a/b = 11/10
Hence, the ratio of their corresponding sides are 11:10
Answer:
Your answer is 11:10 …