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Question 5
In figure AB and CD are common tangents to two circles of unequal radii prove that AB=CD
In figure AB and CD are common tangents to two circles of unequal radii prove that AB=CD
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Solution
Given AB and CD are common tangents to two circles of unequal radius
To prove
Construction: Produce AB and CD to intersect at P.
Proof :
PA =PC
[ The length of tangents drawn from an internal point to a circle are equal]
Also, PB=PD.
[ The lengths of tangents drawn from an internal point to a circle are equal]
⇒ PA – PB = PC – PD
⇒ AB = CD
Hence proved.
To prove
Construction: Produce AB and CD to intersect at P.
Proof :
PA =PC
[ The length of tangents drawn from an internal point to a circle are equal]
Also, PB=PD.
[ The lengths of tangents drawn from an internal point to a circle are equal]
⇒ PA – PB = PC – PD
⇒ AB = CD
Hence proved.
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