## EXERCISE 10.1

#### Page No 171:

#### Question 1:

Fill in the blanks

**(i) **The centre of a circle lies in __________ of the circle. (exterior/ interior)

**(ii) **A point, whose distance from the centre of a circle is greater than its radius lies in __________ of the circle. (exterior/ interior)

**(iii) **The longest chord of a circle is a __________ of the circle.

**(iv) **An arc is a __________ when its ends are the ends of a diameter.

**(v) **Segment of a circle is the region between an arc and __________ of the circle.

**(vi) **A circle divides the plane, on which it lies, in __________ parts.

#### Answer:

**(i) **The centre of a circle lies in __interior__ of the circle.

**(ii)** A point, whose distance from the centre of a circle is greater than its radius lies in __exterior__ of the circle.

**(iii)** The longest chord of a circle is a __diameter __of the circle.

**(iv)** An arc is a __semi-circle __when its ends are the ends of a diameter.

**(v)** Segment of a circle is the region between an arc and __chord__ of the circle.

**(vi)** A circle divides the plane, on which it lies, in __three__ parts.

#### Question 2:

Write True or False: Give reasons for your answers.

(i) Line segment joining the centre to any point on the circle is a radius of the circle.

(ii) A circle has only finite number of equal chords.

(iii) If a circle is divided into three equal arcs, each is a major arc.

(iv) A chord of a circle, which is twice as long as its radius, is a diameter of the circle.

(v) Sector is the region between the chord and its corresponding arc.

(vi) A circle is a plane figure.

#### Answer:

(i) True. All the points on the circle are at equal distances from the centre of the circle, and this equal distance is called as radius of the circle.

(ii) False. There are infinite points on a circle. Therefore, we can draw infinite number of chords of given length. Hence, a circle has infinite number of equal chords.

(iii) False. Consider three arcs of same length as AB, BC, and CA. It can be observed that for minor arc BDC, CAB is a major arc. Therefore, AB, BC, and CA are minor arcs of the circle.

(iv) True. Let AB be a chord which is twice as long as its radius. It can be observed that in this situation, our chord will be passing through the centre of the circle. Therefore, it will be the diameter of the circle.

(v) False. Sector is the region between an arc and two radii joining the centre to the end points of the arc. For example, in the given figure, OAB is the sector of the circle.

(vi) True. A circle is a two-dimensional figure and it can also be referred to as a plane figure.