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The sides of a triangular field are 975 m, 1050 m and 1125 m. If this field is sold at the rate of ₹ 1000 per hectare, find its selling price.

Mensuration

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Answer

Consider a = 975 m, b = 1050 m and c = 1125 m.

We know that,

Semi perimeter (s) = (a+b+c)2\dfrac{(a + b + c)}{2}

Substituting the values we get,

s = (975+1050+1125)2=31502\dfrac{(975 + 1050 + 1125)}{2} = \dfrac{3150}{2} = 1575 m.

Area of triangle = s(sa)(sb)(sc)\sqrt{s(s - a)(s - b)(s - c)}

Substituting values we get,

A=1575(1575975)(15751050)(15751125)=1575×600×525×450=(525×3)×(150×2×2)×(525)×(150×3)=(525)2×(150)2×(2)2×(3)2=525×150×2×3=472500 m2.A = \sqrt{1575(1575 - 975)(1575 - 1050)(1575 - 1125)} \\[1em] = \sqrt{1575 \times 600 \times 525 \times 450} \\[1em] = \sqrt{(525 \times 3) \times (150 \times 2 \times 2) \times (525) \times (150 \times 3)} \\[1em] = \sqrt{(525)^2 \times (150)^2 \times (2)^2 \times (3)^2} \\[1em] = 525 \times 150 \times 2 \times 3 \\[1em] = 472500 \text{ m}^2.

Given,

1 hectare = 10000 m2.

So,

472500 m2 = 47250010000\dfrac{472500}{10000} = 47.25 hectares.

We know that,

Selling price of 1 hectare field = ₹ 1000.

∴ Selling price of 47.25 hectare field = ₹ 1000 × 47.25 = ₹ 47250.

Hence, selling price of the triangular field = ₹ 47250.

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