Mathematics

Consider the following two statements:
Statement 1: The area of a square whose diagonal is 6 cm is 36 cm².
Statement 2: A diagonal of a square divides it into two right angled isosceles triangle.
Which of the following is valid?
Both the statements are true.
Both the statements are false.
Statement 1 is true, and Statement 2 is false.
Statement 1 is false, and Statement 2 is true.

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Let's consider a square ABCD with diagonal AC.

A square is a quadrilateral with four right angles.

Therefore, ∠A = ∠B = ∠C = ∠D = 90°.

AC divides the square into two triangles: △ABC and △ADC.

Both these triangles contain a right angle (at B and D respectively). Thus, they are right-angled triangles.

A square has all four sides equal in length. So, AB = BC = CD = DA.

In △ABC, the two sides AB and BC are equal (sides of the square).

In △ADC, the two sides AD and CD are equal (sides of the square).

Thus, AC divides the square into two right angled isosceles triangles.

∴ Statement 2 is true.

In triangle ABC,

By the Pythagorean theorem:

⇒ AC² = AB² + BC²

Let length of each side of square be a cm and length of diagonal equal to 6 cm (given).

⇒ 6² = a² + a²

⇒ 36 = 2a²

⇒ a² = $\dfrac{36}{2}$ = 18 cm²

As we know that area of square = a²

Thus, area = 18 cm².

∴ Statement 1 is false.

∴ Statement 1 is false, and Statement 2 is true.

Hence, option 4 is the correct option.

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