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Question
In the following figure, XY is parallel to BC, AX = 9 cm, XB = 4.5 cm and BC = 18 cm.
Find :
- `(AY)/(YC)`
- `(YC)/(AC)`
- XY
Solution
i. Given that XY || BC
So, ΔAXY ∼ ΔABC
`=> (AY)/(YC) = 9/4.5`
`=> (AY)/(YC) = 2/1`
`=> (AY)/(YC) = 2`
ii. Given that XY || BC
So, ΔAXY ∼ ΔABC
`=> (AX)/(AB) = (AY)/(AC)`
`=> (AY)/(AC) = 1/(2 + 1)`
`=> (YC)/(AC) = 1/3`
iii. In ΔAXY and ΔABC,
∠XAY = ∠BAC ...(Common angle)
∠AXY = ∠ABC ...(Corresponding angles for parallel lines, XY || BC)
∠AYX = ∠ACB ...(Corresponding angles for parallel lines, XY || BC)
Thus, ΔAXY ∼ ΔABC
Hence, `(AX)/(AB) = (XY)/(BC)` ...(Using similar triangle property)
`(AX)/(AX + XB) = (XY)/18`
`9/(9 + 4.5) = (XY)/18`
`XY = (18 xx 9)/(13.5)`
XY = 12 cm
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