Class 9 Maths Chapter 9 Circles Assertion-Reason Questions

Class 9 Maths Chapter 9 Circles Assertion-Reason Questions

Assertion-Reason Questions

Directions: In the following questions, a statement of Assertion (A) is followed by a statement of Reason (R). Choose the correct option: (a) Both A and R are true, and R is the correct explanation of A. (b) Both A and R are true, but R is not the correct explanation of A. (c) A is true, but R is false. (d) A is false, but R is true.

Question 1

Assertion (A): Equal chords of a circle subtend equal angles at the centre. Reason (R): If two chords of a circle subtend equal angles at the centre, then the chords are equal.

Answer: (b)

Explanation: Assertion (A) is true (Theorem 9.1). Reason (R) is also true (Theorem 9.2), which is the converse of Theorem 9.1. Since R is the converse of A, it does not serve as the explanation or proof for why A is true.

Question 2

Assertion (A): If an arc PQ of a circle subtends angle POQ at the centre O and angle PAQ at a point A on the remaining part of the circle, then $\angle POQ = 2 \angle PAQ$. Reason (R): An exterior angle of a triangle is equal to the sum of the two interior opposite angles.

Answer: (a)

Explanation: Assertion (A) states Theorem 9.7. The proof of Theorem 9.7 uses the property that an exterior angle of a triangle (like $\angle BOQ$) is equal to the sum of the two interior opposite angles ($\angle OAQ + \angle AQO$). This property (R), combined with the fact that OA = OQ (radii), is essential to proving the relationship stated in A. Thus, R is the correct explanation of A.

Question 3

Assertion (A): The perpendicular from the centre of a circle to a chord bisects the chord. Reason (R): The length of the perpendicular from a point to a line is defined as the distance of the line from the point.

Answer: (b)

Explanation: Assertion (A) is true (Theorem 9.3). Reason (R) is also a true definition concerning distance in Mathematics. However, the definition of distance (R) is independent of the theorem about chord bisection (A). R does not explain why A is true.

Question 4

Assertion (A): If two chords of a circle are equidistant from the centre, then the chords must be equal in length. Reason (R): Chords equidistant from the centre (or corresponding centres) of a circle (or of congruent circles) are equal.

Answer: (a)

Explanation: Assertion (A) is a statement of Theorem 9.6. Reason (R) is the precise statement of Theorem 9.6, verifying that A is true. Since R is essentially the theorem itself, confirming A’s truth, R is the correct explanation of A.

Question 5

Assertion (A): In a cyclic quadrilateral ABCD, the sum of opposite angles, $\angle A + \angle C$, must be $180^\circ$. Reason (R): If a quadrilateral has the sum of a pair of opposite angles equal to $180^\circ$, it is called a cyclic quadrilateral.

Answer: (b)

Explanation: Assertion (A) is true (Theorem 9.10). Reason (R) is a definition stemming from Theorem 9.11 (the converse of A), stating the condition for a quadrilateral to be cyclic. Both statements are true, but R (the sufficient condition for being cyclic) does not explain the necessity stated in A (the property of being cyclic).

Question 6

Assertion (A): If a diameter AD of a circle subtends an angle at a point B on the circumference, then $\angle ABD = 90^\circ$. Reason (R): The angle in a semicircle is a right angle.

Answer: (a)

Explanation: A diameter forms a semicircle. The angle subtended by a diameter at any point on the circle is an angle in a semicircle. Assertion (A) is a specific instance of the property stated in Reason (R). Therefore, R is the correct explanation of A.

1. What is the relationship between two chords of a circle if the angles they subtend at the centre are equal?

(A) The chords are perpendicular to each other

(B) The chords are parallel to each other

(D) The chords are equidistant from the circumference

Answer

Answer: (C) The chords are equal in length

2. The perpendicular from the centre of a circle to a chord performs which action?

(A) It doubles the length of the chord

(B) It bisects the chord

(D) It must pass through a point on the minor arc

Answer

Answer: (B) It bisects the chord

3. If two chords of a circle are equal, what can be concluded about their distance from the centre?

(A) They are equidistant from the centre

(B) The longer chord is farther from the centre

(D) Their distances are unequal

Answer

Answer: (A) They are equidistant from the centre

4. If an arc subtends an angle of $100^\circ$ at the centre of a circle, what angle does the same arc subtend at a point on the remaining part of the circle?

(A) 200°

(B) 100°

(D) 90°

Answer

Answer: (C) 50°

5. What is the specific property of the sum of either pair of opposite angles of a cyclic quadrilateral?

(A) The sum is always $90^\circ$

(B) The sum is always $180^\circ$

(D) The sum must be less than $180^\circ$

Answer

Answer: (B) The sum is always $180^\circ$

6. What is the measure of the angle formed in a semicircle?

(A) 45°

(B) 180°

(D) 360°

Answer

Answer: (C) 90°

7. If a line segment joining two points subtends equal angles at two other points lying on the same side of the line, what conclusion can be drawn about the four points?

(A) They form a trapezium

(B) They are concyclic (lie on a circle)

(D) The points must be vertices of a congruent quadrilateral

Answer

Answer: (B) They are concyclic (lie on a circle)

8. When are two circles defined as congruent?

(A) If they have different diameters

(B) If they have the same centre

(D) If they have the same radii

Answer

Answer: (D) If they have the same radii

9. A quadrilateral ABCD is called cyclic if:

(A) Only two vertices lie on a circle

(B) All four vertices lie on a circle

(D) Its opposite sides are equal

Answer

Answer: (B) All four vertices lie on a circle

10. Which relationship is true between the length of a chord and its distance from the centre?

(A) Longer chords are nearer to the centre than smaller chords

(B) Shorter chords are nearer to the centre than longer chords

(D) Only perpendicular chords have defined distances from the centre

Answer

Answer: (A) Longer chords are nearer to the centre than smaller chords