AB and CD are two parallel chords of a circle (lying on opposite sides of the center) such that AB=10cm,CD=24cm. If the distance between AB and CD is 17cm,determine the radius of the circle.
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distance between AB & CD = 17
let the centre is O. P is the midpoint of chord AB. AB = 10cm AP & PB = 5cm
OP= 17/2=8.5 cm
then OBsquare=OPsquare+PBsquare
= 72.25+25
=97.25
r = 9.86 cm
let the centre is O. P is the midpoint of chord AB. AB = 10cm AP & PB = 5cm
OP= 17/2=8.5 cm
then OBsquare=OPsquare+PBsquare
= 72.25+25
=97.25
r = 9.86 cm
Answered by
5
Answer:
Step-by-step explanation:
since op perpendicular to ab and oq perpendicular to cd nd ab parallel to cd
poq is a st. line
ab=10cm,cd=24cm nd pq is 17cm
ap=bp=half ab = 5cm and cq=dq=half cd =12cm
if oq=x cm ,then op= (17-x)cm
join oa nd oc
oa=oc=r(radius)
now in right angled triangle oap,
oa square=op square+ap square
=r square=(17-x)square+ 5square_ist equation
in right angled triangle ocq,
oc square=oq square+cq square
=r square=x square+12square_2nd equation
frm ist nd 2nd equations ,we get :
on solving we get x=5
r square=x square+12 square
r square=5 square+12 square
r square= 25+144
r = 13cm
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