Math, asked by vardhmangupta2609, 11 months ago

PLZ SOLVE THIS ,,
An isosceles triangle PQR, in which PQ = PR = 8 cm, is inscribed in a circle of radius 10 cm, find the area
of the triangle.

Answers

Answered by bhagyashreechowdhury
0

If an isosceles triangle is inscribed in a circle of radius 10 cm then the area of the triangle is 23.46 cm².

Step-by-step explanation:

It is given that,  

ΔPQR is an isosceles triangle inscribed in a circle with center O where PQ = PR = 8 cm

The radius of the circle PO = OQ = OR = 10 cm (refer to the figure attached below).

Required formula:

(1) Area of the triangle = ½ * [product of two sides] * [sine of the included angle]

(2) The cosine rule: a² = b²+ c² – (2bc cos A) ← this rule holds true for all respective sides and angles.

Step 1:

Based on formula in (1), we have  

The area of ∆ PQR as,

=  ½ * [PQ * PR ] * sin ∠P  

= ½ * 8 * 8 * sin ∠P  

= ½ * 64 * sin ∠P

= 32 * sin ∠P …… (i)

Step 2:

Now, considering the side QR of triangle PQR and applying the cosine rule for the formula in (2), we get

QR² = PQ² + PR² - [2PQ * PRcos∠P]

⇒ QR² = 8² + 8² - [2 * 8²*cos∠P]

⇒ QR² = 64 + 64 – 128 [cos∠P]

QR² = 128* [1 - cos∠P] …… (ii)

Similarly, considering the side QR of triangle QOR and applying the cosine rule for the formula in (2), we get

QR² = QO² + RO² - [2 QO*OR*cos∠QOR]

⇒ QR² = 10² + 10² - [2*10²cos∠2P] …… [since angle subtended by chord QR at the centre is twice the angle subtended at the arc, therefore ∠QOR = 2∠P )

⇒ QR² = 100 + 100 – 200[ 1 - cos∠2P]

QR² = 200 * [ 1 - cos∠2P] ……. (iii)

Step 3:

Comparing eq. (ii) & (iii), we get

128* [1 - cos∠P] = 200 * [ 1 - cos∠2P]

⇒ 16* [1 - cos∠P] = 25 * [ 1 - cos∠2P]

⇒ 16 * [1 - cos∠P] = 25 * [1 – (2cos²∠P-1)]

⇒ 16 * [1 - cos∠P] = 25 * [2 – 2cos²∠P]

⇒ 8 * [1 - cos∠P] = 25 * [1 - cos²∠P]

⇒ 25cos²∠P – 8cos∠P - 17 = 0

⇒ 25cos²∠P – 25cos∠P + 17cos∠P - 17 = 0

⇒ 25cos∠P[cos∠P – 1] + 17[cos∠P – 1] = 0

⇒ [cos∠P – 1][25cos∠P + 17] = 0

cos∠P = 1  or cos∠P = -17/25

[For cos∠P = 1, the angle ∠P = 0, so this is not possible ]

cos∠P = -17/25

∠P = cos⁻¹ [-17/25] = 132.84°

sin∠P = sin 132.84° = 0.733

Thus, substituting the value of sin∠P in eq. (i), we get

The Area of triangle PQR,

= 32 * 0.733

= 23.46 cm²

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Attachments:
Answered by amitnrw
0

Area of triangle =   23.46 cm²

Step-by-step explanation:

Area of triangle =  (PQ * PR  * Sin ∠P  )/2

= (8 * 8 * Sin ∠P  )/2

= 32Sin ∠P

QR² = PQ² + PR² - 2PQ * PRCos∠P

=> QR² = 8² + 8² - 2*8²Cos∠P

=> QR² = 128(1 - Cos∠P)

QR² = QO² + RO² - 2 QO*ORCos∠QOR

∠QOR = 2∠P  ( angle subtended by chord QR at cneter & arc)

=> QR² = 10² + 10² - 2*10²Cos∠2P

=> QR² = 200 ( 1 - Cos∠2P)

128(1 - Cos∠P) = 200 ( 1 - Cos∠2P)

=> 16(1 - Cos∠P) = 25 ( 1 - Cos∠2P)

=> 16(1 - Cos∠P) = 25 (2 - 2Cos²∠P)

=> 8(1 - Cos∠P) = 25 (1 - Cos²∠P)

=> 25Cos²∠P - 8Cos∠P - 17 = 0

=> 25Cos²∠P - 25Cos∠P + 17Cos∠P - 17 = 0

=> 25Cos∠P(Cos∠P - 1) + 17(Cos∠P - 1) = 0

=> Cos∠P = 1  or Cos∠P = -17/25

Cos∠P = 1 is not possible  as angle would be zero

Cos∠P = -17/25

Sin∠P = 0.733

Area of triangle =   32Sin ∠P = 23.46 cm²

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