Register

△ABC∼△DEF , △ABC has a height of 14 centimeters, and △DEF has a height of 6 centimeters. What is the ratio of the area of △ABC to the area of △DEF ?

△ABC∼△DEF , △ABC has a height of 14 centimeters, and △DEF has a height of 6 centimeters. What is the ratio of the area of △ABC to the area of △DEF ?
228k views
3 votes
△ABC∼△DEF , △ABC has a height of 14 centimeters, and △DEF has a height of 6 centimeters. What is the ratio of the area of △ABC to the area of △DEF ?

User Jdorfman
by
7.3k points

2 Answers

3 votes

Answer:

49:9

Explanation:

△ABC∼△DEF , △ABC has a height of 14 centimeters, and △DEF has a height of 6 centimeters-example-1
User Hwrd
by
8.6k points
2 votes
Since triangle ABC is similar to triangle DEF then the ratio of the corresponding sides is constant.
The ratio of the corresponding lengths is referred to as the linear scale factor.
Considering the heights of the two triangles;
L.S.F = 14/6
= 7/3
The ratio in area (A.S.F) is given by (L.S.F)²
Therefore, A.S.F = (7/3)² = 49/9
Thus te ratio of the area of triangle ABC to DEF is 49:9
User Ortsigat
by
8.1k points
← Prev Question Next Question →

Related questions

User GeoNomad
asked May 12, 2024 155k views
If △ABC∼△DEF, what is the scale factor for the dilation that maps △ABC to △DEF?
GeoNomad asked May 12, 2024
by GeoNomad
8.4k points
1 answer
5 votes
155k views
Ask a Question
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

9.4m questions

12.2m answers

Categories

Other Questions

How do you can you solve this problem 37 + y = 87; y =
What is .725 as a fraction
How do you estimate of 4 5/8 X 1/3
Link Copied!