Question

Fig. 12.102 in APQR, PQ = 8cm, PR - 10 cm and
2Q = 90°. A and B are points on sides PQ and PR
respectively such that AB = 2cm and ZABP = 90°
Find :
(1) the area of APAB
(ii) area of quad. AQRB: area of APQR.​

Answer 1

Step-by-step explanation:

Given: In △PQR

PQ=10 cm QR=12cm ,PR=8cm then we have to find the greatest and smallest angle.

As the length of side are in the same order as the measure of the angles opposite the lengths of sides. The greatest side is opposite to the greatest angle.

By using the properties of triangle , if one angle of a triangle is larger than the other angle, then the side opposite to the larger angle is greater than the side opposite to the smaller angle.

Longest side=QR=12cm

∴ Greatest angle measure is ∠P

Smallest side=PR=8cm

∴ Smallest angle measure is ∠Q

Answer 2

Answer:

Answer ,

Step-by-step explanation:

Each and every step is there accept i have found the area of triangle PQR directly