Question

If areas of similar ΔABC and  ΔPQR are 196 cm² and 289 cm² respectively. If AB is 28 cm longer. What is the length of PQ? 
1. 30 cm
2. 34 cm
3. 17 cm
4. 51 cm

Answer 1

Correct Answer - Option 2 : 34 cm

Given:

ΔABC ∼ ΔPQR

Area of ΔABC = 196 cm2

Area of ΔPQR = 289 cm2

AB = 28 cm

Concept:

The ratio of the area of two similar triangles is proportional to the squares of the corresponding sides of both triangles.

Calculation:

The ratio of the area of two similar triangles is proportional to the squares of the corresponding sides of both triangles.

⇒ (Area of ΔABC)/( Area of ΔPQR) = (AB/PQ)² = (BC/QR)² = (AC/PR)²

⇒ (196 cm²/289 cm²) = (28 cm/PQ)²

⇒ 14 cm/17 cm = 28 cm/ PQ

By cross multiplication

⇒ PQ = 34 cm

∴ The length of PQ is 34 cm.

The correct option is 2 i.e. 34 cm