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Question
In fig., a circle is inscribed in a triangle ABC having side BC = 8 cm, AC = 10 cm and AB = 12 cm. Find AD, BE and CF. [3 MARKS]
In fig., a circle is inscribed in a triangle ABC having side BC = 8 cm, AC = 10 cm and AB = 12 cm. Find AD, BE and CF. [3 MARKS]
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Solution
Concept: 1 Mark
Application: 2 Marks
Given that BC = 8 cm, AC = 10 cm and AB = 12 cm
As the lengths of tangents drawn from an external point to a circle are equal.
Let AD = AF = x, CF = CE = y, BD = BE = z
x + y = 10 ...(i)
y+z=8⇒y=8−z
Substituting in (i)
x + 8 - z = 10
x - z = 2 ...(ii)
x + z = 12 ...(iii)
Adding (ii) and (iii), we get,
2x = 14
x = 7
From (i) y = 3
From (ii)
x-z = 2
⇒ 7- z = 2
⇒ z = 5
Therefore AD = 7, BE = 5 and CF = 3
Concept: 1 Mark
Application: 2 Marks
Given that BC = 8 cm, AC = 10 cm and AB = 12 cm
As the lengths of tangents drawn from an external point to a circle are equal.
Let AD = AF = x, CF = CE = y, BD = BE = z
x + y = 10 ...(i)
y+z=8⇒y=8−z
Substituting in (i)
x + 8 - z = 10
x - z = 2 ...(ii)
x + z = 12 ...(iii)
Adding (ii) and (iii), we get,
2x = 14
x = 7
From (i) y = 3
From (ii)
x-z = 2
⇒ 7- z = 2
⇒ z = 5
Therefore AD = 7, BE = 5 and CF = 3
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