Question

Which of the following statements are true and which are false? In each case give a valid reason for saying so
(i) p : Each radius of a circle is a chord of the circle.
(ii) q : The centre of a circle bisects each chord of the circle.
(iii) r : Circle is a particular case of an ellipse.
(iv) s : If x and y are integers such that x > y, then − x < − y.
(v) t : $\sqrt{11}$ is a rational number.

Answer 1

(i) The given statement is false.

According to the definition of a chord, it should intersect the circumference of a circle at two distinct points.

(ii) The given statement is false.

If a chord is not the diameter of a circle, then the centre does not bisect that chord. In other words, the centre of a circle only bisects the diameter, which is the chord of the circle.

(iii) Equation of an ellipse:

$\frac{x^2}{a^2}+\frac{y^2}{b^2}=1$

If we put a = b = 1, then we obtain $x^2+y^2=1$, which is an equation of a circle. Therefore, a circle is a particular case of an ellipse.

Thus, the statement is true.

(iv) x > y

⇒ –x < –y (By the rule of inequality)

Thus, the given statement is true.

(v) 11 is a prime number and we know that the square root of any prime number is an irrational number. Therefore, $\sqrt{11}$ is an irrational number.

Thus, the given statement is false.