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Question
Question 40
A trapezium with 3 equal sides and one side double the equal side, can be divided into ___ equilateral triangles of ___ area.
Question 40
A trapezium with 3 equal sides and one side double the equal side, can be divided into
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Solution
3, equal.
Let ABCD be a trapezium, in which
AD = DC = BC = a (say)
and AB = 2a [given]
Draw medians through the vertices D and C on the side AB
∴ AE = EB = a
Now, in parallelogram ADCE, we have
AD = EC = a and AE = CD = a [∵ opposite sides in a parallelogram are equal]
In ΔADE and ΔDEC,
AD = EC
AE = CD
and DE = DE [common]
By SSS, ΔADE=ΔDEC
By triangle rule, ΔADE≅ΔDEC
Thus, ΔADE and ΔDEC are equilateral triangles having equal sides
Similarly, in parallelogram DEBC, we can show that ΔDEC≅ΔECB
Hence, the trapezium can be divided into 3 equilateral triangles of equal area.
3, equal.
Let ABCD be a trapezium, in which
AD = DC = BC = a (say)
and AB = 2a [given]
Draw medians through the vertices D and C on the side AB
∴ AE = EB = a
Now, in parallelogram ADCE, we have
AD = EC = a and AE = CD = a [∵ opposite sides in a parallelogram are equal]
In ΔADE and ΔDEC,
AD = EC
AE = CD
and DE = DE [common]
By SSS, ΔADE=ΔDEC
By triangle rule, ΔADE≅ΔDEC
Thus, ΔADE and ΔDEC are equilateral triangles having equal sides
Similarly, in parallelogram DEBC, we can show that ΔDEC≅ΔECB
Hence, the trapezium can be divided into 3 equilateral triangles of equal area.
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