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Question

AB is a line segment. With A and B as centres and any radius greater than half of AB, draw arcs on either side of AB so that they meet at X and Y as shown. Join XY

There are the two statements:
Statement 1: AB is the perpendicular bisector of XY
Statement 2: XY is the perpendicular bisector of AB
Choose the correct option from below.


A
Only Statement 1 is true
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B
Only Statement 2 is true
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C
Both the statements are true
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D
None of the above
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Solution

The correct option is C Both the statements are true

If AB is a perpendicular bisector of line XY, it should divide XY in such a way that XO = OY and AOX = AOY = 90.
We shall see if it is true or not.
Since XY is the perpendicular bisector, AO = OB.

Join AX, AY and BX, BY.
Consider AXY and BXY,
AX = AY = BX = BY (same radius)
XY = XY (common side)
AXY BXY (By S.S.S congruency)

AOX = BOX = 90 (since AOB = 180).
Similarly, AOY = BOY = 90.

Now, in AOX and BOY,
AX = BY,
AO = OB,
AOX = BOY = 90,
AOX BOY (RHS postulate)
Hence OX = OY.
So both the statements are true.


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