In the given figure, PQR is a triangle and S is any point in its interior. Then which of the following option is correct?

S Q + S R < P Q + P R

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S Q + S R > P Q + P R

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S Q + P Q > S R + P R

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S Q - S R > P Q - P R

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Solution

The correct option is A $S Q + S R < P Q + P R$
S is any point in the interior of $Δ P Q R$ .
In $Δ P Q T, P Q + P T > Q T$ [ $∵$ Sum of the two sides of a triangle is greater than the third side]
$\Rightarrow P Q + P T > S Q + S T$ $\dots$ (1)
$[∵ Q T = S Q + S T]$
Also, in $Δ R S T$ ,
$S T + T R > S R$ $\dots$ (2) [ $∵$ Sum of the two sides of a triangle is greater than the third side]
Adding (1) and (2), we get
$P Q + P T + S T + T R > S Q + S T + S R$
$\Rightarrow P Q + (P T + T R) > S Q + S R$ [Cancelling ST on both sides.]
$∴ P Q + P R > S Q + S R$

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