In the given figure, $△ P R T$ is an equilateral triangle. Line segments TQ and PS are perpendicular bisectors to side PR and side TR respectively. Which of these statement(s) is/are correct?

△ P Q T ≅ △ R Q T

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△ T S P ≅ △ R S P

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△ R S P ≅ △ P Q T

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None of the above.

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Solution

The correct options are
A $△ P Q T ≅ △ R Q T$
B $△ T S P ≅ △ R S P$
C $△ R S P ≅ △ P Q T$
Given, $△ P R T$ is an equilateral.

So, PR = RT = TP

TQ and PS are perpendicular bisectors to the sides PR and TR respectively.

So, PQ = RQ = TS = SR

Therefore, in triangles,
$△ P Q T and △ R Q T,$
side PQ = side RQ
side QT is common
side TP = side TR

Hence, by SSS criterion for congruency of triangles,
$△ P Q T ≅ △ R Q T .$

Again, in triangles,
$△ T S P and △ R S P,$
side TS = side RS
side SP is common
side PT = side PR

Hence, by SSS criterion for congruency of triangles,
$△ T S P ≅ △ R S P .$

Also, in triangles,
$△ R S P and △ P Q T,$
side RS = side PQ
$∠ R S P = ∠ P Q T = 90^{\circ}$
side PR = side TP (hypotenuse of the respective triangles)

Hence, by RHS criterion for congruency of triangles,
$△ P Q T ≅ △ R Q T .$

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In the given figure, △PRT is an equilateral triangle. Line segments TQ and PS are perpendicular bisectors to side PR and side TR respectively. Which of these statement(s) is/are correct?

In the given figure, $△ P R T$ is an equilateral triangle. Line segments TQ and PS are perpendicular bisectors to side PR and side TR respectively. Which of these statement(s) is/are correct?