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Question
In Fig. PQR is a triangle and S is any point in its interior, show that SQ + SR < PQ + PR. [3 MARKS]
In Fig. PQR is a triangle and S is any point in its interior, show that SQ + SR < PQ + PR. [3 MARKS]
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Solution
Process : 2 Marks
Proof : 1 Mark
Given: S is any point in the interior of △PQR
To prove: SQ + SR < PQ + PR
Constructions: Produce QS to meet PR in T.
Proof:
In △ PQT, we have
PQ + PT > QT
[Sum of two sides of a triangle are greater than the third side]
⇒ PQ + PT > QS + ST ......(i) [∵ QT = QS + ST]
In △RST, we have
ST + TR > SR .........(ii)
Adding (i) and (ii), we get
PQ + PT + ST + TR > SQ + ST + SR
⇒ PQ + (PT + TR) > SQ + SR
⇒ PQ +PR > SQ + SR
⇒ SQ + SR < PQ + PR.
Process : 2 Marks
Proof : 1 Mark
Given: S is any point in the interior of △PQR
To prove: SQ + SR < PQ + PR
Constructions: Produce QS to meet PR in T.
Proof:
In △ PQT, we have
PQ + PT > QT
[Sum of two sides of a triangle are greater than the third side]
⇒ PQ + PT > QS + ST ......(i) [∵ QT = QS + ST]
In △RST, we have
ST + TR > SR .........(ii)
Adding (i) and (ii), we get
PQ + PT + ST + TR > SQ + ST + SR
⇒ PQ + (PT + TR) > SQ + SR
⇒ PQ +PR > SQ + SR
⇒ SQ + SR < PQ + PR.
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