Math, asked by divyaojha04, 4 months ago

- Two parallel chords of length 30 cm and 16 cm are drawn on the opposite sides of the centre of a circle of radius 17 cm. Find the distance between the chords.​

Answers

Answered by sanjeevmathur198083
4

Answer:

23cm

Step-by-step explanation:

Let AB and CD be two chords of a circle such that AB is parallel to CD and they are on the opposite sides of the center.

AB=30cm and CD=16cm [ Given ]

Draw OL⊥AB and OM⊥CD.

Join OA and OC.

OA=OC=17cm [ Radius of a circle ]

The perpendicular from the center of a circle to a chord bisects the chord.

∴ AL=

2

AB

=

2

30

=15cm

Now, in right angled △OLA,

∴ (OA)

2

=(AL)

2

+(LO)

2

[ By Pythagoras theorem ]

⇒ (LO)

2

=(OA)

2

−(AL)

2

⇒ (LO)

2

=(17)

2

−(15)

2

⇒ (LO)

2

=289−225

⇒ (LO)

2

=64

⇒LO=8

Similarly,

In right angled △CMO,

⇒ (OC)

2

=(CM)

2

+(MO)

2

⇒ (MO)

2

=(OC)

2

−(CM)

2

⇒ (MO)

2

=(17)

2

−(8)

2

⇒ (MO)

2

=289−64

⇒ (MO)

2

=225

∴ MO=15cm

Hence, distance between the chords =(LO+MO)=(8+15)cm=23cm

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