Math, asked by nagarajurakams, 11 months ago

a right angle triangle of sides containing right angle are 6 cm and 8 cm is inscribed in a circle with circle whose radius 5 cm as shown in the figure find the area of shaded region​

Answers

Answered by Hemalathajothimani
30

Answer:

Step-by-step explanation:

ANSWER

ABC is a right angled triangle where ∠A=90  

 

BC=10cm and AB=6cm

Let O be the centre and r be the radius of the in-circle.

AB,BC and CA are the tangents to the circle at P,M and N

∴IP=IM=IN=r(radius of the circle)

In △BAC,

BC  

2

=AB  

2

+AC  

2

(by pythagoras theorem)

⇒10  

2

=6  

2

+AC  

2

 

⇒AC  

2

=100−36=64

∴AC=8cm

Area of △ABC=  

2

1

​  

bh=  

2

1

​  

×AC×AB=  

2

1

​  

×8×6=24sq.cm

Area of △ABC=Area of △IAB+Area of △IBC+ Area of △ICA

⇒24=  

2

1

​  

r(AB)+  

2

1

​  

r(BC)+  

2

1

​  

r(CA)

⇒24=  

2

1

​  

r(AB+BC+CA)

⇒24=  

2

1

​  

r(6+8+10)

⇒24=12r  

∴r=  

12

24

​  

=2cm

Area of the circle=πr  

2

=  

7

22

​  

×2  

2

=12.56sq.cm

Area of shaded region=Area of △ABC−Area of the circle.

                                    =24−12.56=11.44sq.cm

Answered by shubham1507
3

Answer:

correct answer thanks...........

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