Classes

Class 10 Math Chords of a Circle


Change the way you learn with Maqsad's classes. Local examples, engaging animations, and instant video solutions keep you on your toes and make learning fun like never before!

Class 9Class 10First YearSecond Year
(i)InthecircularfigureADBiscalled(a)anarc(b)asecant(c)achord.(d)adiameter(i) In the circular figure A D B is called(a) an arc(b) a secant(c) a chord.(d) a diameter

3. If length of the chord \overline{A B}=8 \mathrm{~cm} . Its distance from the centre is 3 \mathrm{~cm} then find the diameter of such circle.
3. If length of the chord  \overline{A B}=8 \mathrm{~cm} . Its distance from the centre is  3 \mathrm{~cm}  then find the diameter of such circle.

3.IflengthofthechordAB=8 cm.Itsdistancefromthecentreis3 cmthenfindthediameterofsuchcircle.3. If length of the chord \overline{A B}=8 \mathrm{~cm} . Its distance from the centre is 3 \mathrm{~cm} then find the diameter of such circle.

(xi) Locus of a point in a plane equidistant from a fixed point is called(a) radius(b) circle(c) circumference(d) diameter
(xi) Locus of a point in a plane equidistant from a fixed point is called(a) radius(b) circle(c) circumference(d) diameter

(xi)Locusofapointinaplaneequidistantfromafixedpointiscalled(a)radius(b)circle(c)circumference(d)diameter(xi) Locus of a point in a plane equidistant from a fixed point is called(a) radius(b) circle(c) circumference(d) diameter

Example: Prove that the largest chord in a circle is the diameter.
Example: Prove that the largest chord in a circle is the diameter.

Example:Provethatthelargestchordinacircleisthediameter.Example: Prove that the largest chord in a circle is the diameter.

(v) Radii of a circle are(a) all equal(b) - double of the diameter(c) all unequal(d) half of any chord
(v) Radii of a circle are(a) all equal(b) - double of the diameter(c) all unequal(d) half of any chord

(v)Radiiofacircleare(a)allequal(b)doubleofthediameter(c)allunequal(d)halfofanychord(v) Radii of a circle are(a) all equal(b) - double of the diameter(c) all unequal(d) half of any chord

2. Two chords of a circle do not pass through the centre. Prove that they cannot bisect each other.
2. Two chords of a circle do not pass through the centre. Prove that they cannot bisect each other.

2.Twochordsofacircledonotpassthroughthecentre.Provethattheycannotbisecteachother.2. Two chords of a circle do not pass through the centre. Prove that they cannot bisect each other.

(ii) In the circular figure A \widehat{C B} is called(a) an arc(b) a secant(c) a chord(d) a diameter
(ii) In the circular figure  A \widehat{C B}  is called(a) an arc(b) a secant(c) a chord(d) a diameter

(ii)InthecircularfigureACB^iscalled(a)anarc(b)asecant(c)achord(d)adiameter(ii) In the circular figure A \widehat{C B} is called(a) an arc(b) a secant(c) a chord(d) a diameter

banner6000+ MCQs with instant video solutions