Math, asked by sangeetabisht5992, 5 months ago

if length of a chord passing through the centre of the circle is 10 cm, what is the
radius of the circle?

Answers

Answered by hemlata2712107

Answer:

5.6cm is the answer

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Answered by fenisebastian

ANSWER

ANSWERR.E.F image

ANSWERR.E.F image Given length of chord AB = 12 cm.

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC=

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cm

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OAC

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6)

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8)

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8) 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8) 2 =36+64

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8) 2 =36+64[ OA=10 cm].

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8) 2 =36+64[ OA=10 cm].∴ Diameter of circle is 2(OA) = 20 cm.

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if length of a chord passing through the centre of the circle is 10 cm, what is theradius of the circle?​

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ANSWER

ANSWERR.E.F image

ANSWERR.E.F image Given length of chord AB = 12 cm.

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC=

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cm

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OAC

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6)

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8)

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8) 2

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8) 2 =36+64

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8) 2 =36+64[ OA=10 cm].

ANSWERR.E.F image Given length of chord AB = 12 cm.Distance of chord from center = 8 cm.OC=8 cm .AC= 212 =6 cmIn △OACOA 2 =AC 2 +OC 2 OA 2 =(6) 2 +(8) 2 =36+64[ OA=10 cm].∴ Diameter of circle is 2(OA) = 20 cm.

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if length of a chord passing through the centre of the circle is 10 cm, what is the
radius of the circle?