My Learning Cart

If two triangles are similar and the ratio of their corresponding sides is 3:5,

Practice Questions

Q1
If two triangles are similar and the ratio of their corresponding sides is 3:5, what is the ratio of their areas?
  1. 3:5
  2. 9:25
  3. 15:25
  4. 6:10

Questions & Step-by-Step Solutions

If two triangles are similar and the ratio of their corresponding sides is 3:5, what is the ratio of their areas?
  • Step 1: Understand that similar triangles have the same shape but different sizes.
  • Step 2: Note the given ratio of the corresponding sides of the triangles, which is 3:5.
  • Step 3: Recognize that to find the ratio of the areas of similar triangles, you need to square the ratio of their corresponding sides.
  • Step 4: Calculate the square of the ratio 3:5. This means you calculate (3/5)².
  • Step 5: Perform the calculation: (3/5)² = 3² / 5² = 9 / 25.
  • Step 6: Conclude that the ratio of the areas of the two triangles is 9:25.
No concepts available.
Soulshift Feedback ×

On a scale of 0–10, how likely are you to recommend The Soulshift Academy?

Not likely Very likely