Mathematics

A square has the perimeter 56 m. Find its area and the length of one diagonal correct up to two decimal places.

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Let ABCD be a square with side x metres.

Perimeter of square = 4 × side

Substituting the values we get,

⇒ 56 = 4x

⇒ x = $\dfrac{56}{4}$ = 14 m.

Since, each angle = 90° in a square.

In right angle triangle ABC

Using Pythagoras theorem,

⇒ AC² = AB² + BC²

⇒ AC² = 14² + 14²

⇒ AC² = 196 + 196 = 392

⇒ AC = $\sqrt{392}$

⇒ AC = $14\sqrt{2}$ = 14 × 1.414 = 19.80 m.

Area of square = (side)²

= 14² = 196 m².

Hence, the area of square = 196 m² and length of diagonal = 19.80 m.

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