Step-by-step explanation:
Given:
△ABC = △PQR
A (△ABC) = 80
A (△PQR) = 125
According to theorem of areas of
similar
triangles "When two triangles are similar, the
ratio of areas of those triangles is equal to the ratio of the squares of their
corresponding sides".
A(△ABC) AB²
∴ ________ = ______
A(△PQR) PQ²
=> 80 AB²
__ = _____
125 PQ²
=> 16 AB²
___ = _____
25 PQ²
=> 4² AB²
__ = ____
5² PQ²
=> AB 4
___ = ___
PQ 5
Therefore,
A(△ABC) 80 AB 4
_________ = ____ and ____ = ___
A (△PQR) 125 PQ 5
Please mark it as a brainliests answer.
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Answers & Comments
Step-by-step explanation:
Given:
△ABC = △PQR
A (△ABC) = 80
A (△PQR) = 125
According to theorem of areas of
similar
triangles "When two triangles are similar, the
ratio of areas of those triangles is equal to the ratio of the squares of their
corresponding sides".
A(△ABC) AB²
∴ ________ = ______
A(△PQR) PQ²
=> 80 AB²
__ = _____
125 PQ²
=> 16 AB²
___ = _____
25 PQ²
=> 4² AB²
__ = ____
5² PQ²
=> AB 4
___ = ___
PQ 5
Therefore,
A(△ABC) 80 AB 4
_________ = ____ and ____ = ___
A (△PQR) 125 PQ 5
Please mark it as a brainliests answer.