Class 6 Exam  >  Class 6 Notes  >  RD Sharma Solutions for Class 6 Mathematics  >  RD Sharma Solutions -Page No.14.5 & 14.6, Circles, Class 6, Maths

Page No.14.5 & 14.6, Circles, Class 6, Maths RD Sharma Solutions | RD Sharma Solutions for Class 6 Mathematics PDF Download

PAGE NO 14.5:


Question 9:Fill in the blanks:
(i) The diameter of a circle is .....times its radius.
(ii) The diameter of a circle is the ..... chord of the cirlce.
(iii) The diameter of a circle pass through......
(iv) A chord of a circle is a line segment with its end points on the....
(v) If we join any two points on a circle by a line segment, we obtain.... of the circle.
(vi) A radius of a circle is a line segment with one end at .... and the other end at.....
(vii) All radii of a circle are.....
(viii) The diameters of a circle are
(ix) The total number of diameters of a circle is .....
(x) Every point on a circle is .....from its centre.
(xi) A chord of a circle contains exactly ...... points of the circle.
(xii) A diameter is the longest.......
(xiii) Concentric circles are circles having.......

ANSWER: (i) two

(ii) longest

(iii) the centre of the circle

(iv) circle

(v) chord

(vi) the centre, on the circle

(vii) equal

(viii) concurrent

(ix) infinite

(x) equidistant

(xi) two

(xii) chord

(xiii) the same centre point


Question 10:In each of the following, state if the statement is true (T) of false (F);
(i) Every circle has a centre.
(ii)  The centre of a circle is a point of the circle.
(iii) Any two radii of a circle make up a diameter.
(iv) Every chord of a circle is parallel to some diameter of the circle.
(v) A circle is symmetric about each of its diameters.
(vi) The diameter is twice the radius.
(vii) A radius is a chord of the circle.
(viii) Concentric circles have the same radii.
(ix) The nearer a chord to the centre of a circle, the longer is its length.
ANSWER:
(i) T

(ii) F

(iii) F

(iv) F

(v) T

(vi) T

(vii) F

(viii) F

(ix) T 


Question 1: A circle of radius r cm has diameter of length
(a) r cm
(b) 2r cm
(c) 4r cm(d) r/2 cm 
ANSWER:
(b) 2r cm

(Diameter = 2x radius)


Question 2: A chord of a circle passing through its centre is equal to its
(a) radius
(b) diameter
(c) circumference
(d) none of these
ANSWER:
(b) Diameter


Question 3: The total number of diameters of a circle is
(a) 1
(b) 2
(c) 4
(d) uncountable number
ANSWER:
(d) An uncountable number

The number of points in a circle is infinite. So, the number of diametrically opposite points in a circle is also infinite. Hence, the number of diameters of a circle is uncountable.


Question 4: By joining any two points on a circle, we obtain its
(a) radius
(b) diameter
(c) chord
(d) circumference
ANSWER:
(c) Chord


PAGE NO 14.6:


Question 5: The longest chord of a circle is equal to its
(a) radius
(b) diameter
(c) circumference
(d) perimeter
ANSWER:
(b) Diameter 


Question 6: How many circles can be drawn to pass through two given points?
(a) 1
(b) 2
(c) 0
(d) As many as possible
ANSWER:
(d) As many as possible

(Three non-collinear points define one specific circle. From any two given points, infinite number of circles can be drawn.)


Question 7: How many circles can be drawn to pass through three non-collinear points?
(a) 1
(b) 2
(c) 0
(d) As many as possible
ANSWER:
(a) 1

The document Page No.14.5 & 14.6, Circles, Class 6, Maths RD Sharma Solutions | RD Sharma Solutions for Class 6 Mathematics is a part of the Class 6 Course RD Sharma Solutions for Class 6 Mathematics.
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FAQs on Page No.14.5 & 14.6, Circles, Class 6, Maths RD Sharma Solutions - RD Sharma Solutions for Class 6 Mathematics

1. What is the definition of a circle in mathematics?
Ans. A circle is a closed figure in which all points are equidistant from a fixed point called the center. The distance from the center to any point on the circle is called the radius.
2. How can we find the circumference of a circle?
Ans. The circumference of a circle can be found using the formula: Circumference = 2πr, where 'r' is the radius of the circle. If the diameter of the circle is given, we can use the formula: Circumference = πd, where 'd' is the diameter.
3. Can the radius of a circle be negative?
Ans. No, the radius of a circle cannot be negative. The radius represents the distance from the center of the circle to any point on the circle's circumference. Distance is always positive, so the radius cannot be negative.
4. How is the area of a circle calculated?
Ans. The area of a circle can be calculated using the formula: Area = πr^2, where 'r' is the radius of the circle. If the diameter of the circle is given, we can use the formula: Area = (π/4)d^2, where 'd' is the diameter.
5. What are some real-life applications of circles?
Ans. Circles have various real-life applications, such as in the design of wheels, plates, and coins. They are also used in architecture for designing arches and domes. In engineering, circles are used in the construction of gears and pulleys. Additionally, circles are fundamental in trigonometry and geometry, allowing us to understand the properties of angles and shapes.
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