In the above question, point C is called a mid-point of line segment AB, prove that every line segment has - Maths - Introduction to Euclid\s Geometry

Question

In the above question, point C is called a mid-point of line
segment AB, prove that every line segment has one and only one
mid-point

Gopal Mohanty · Accepted Answer

Solution :

Let there be two mid-points, C and D
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C is the mid-point of AB
AC = CB
AC + AC = BC + AC (Equals are added on both sides) …
(1)
Here, (BC + AC) coincides with AB It is known that things which
coincide with one another are equal to one another
∴ BC + AC = AB … (2)
It is also known that things which are equal to the same thing
are equal to one another Therefore, from equations (1) and (2), we
obtain
AC + AC = AB
⇒ 2AC = AB … (3)
Similarly, by taking D as the mid-point of AB, it can be proved
that
2AD = AB … (4)
From equation (3) and (4), we obtain
2AC = 2AD (Things which are equal to the same thing are equal to
one another )
⇒ AC = AD (Things which are double of the same things are
equal to one another )
This is possible only when point C and D are representing a
single point
Hence, our assumption is wrong and there can be only one
mid-point of a given line segment

In the above question, point C is called a mid-point of line segment AB, prove that every line segment has one and only one mid-point.