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answer:
4 We know that,
The sum of the length of any two sides is always greater than the third side.
Now consider the ΔABC,
Here, AB + BC > CA … [equation i]
Then, consider the ΔBCD
Here, BC + CD > DB … [equation ii]
Consider the ΔCDA
Here, CD + DA > AC … [equation iii]
Consider the ΔDAB
Here, DA + AB > DB … [equation iv]
By adding equation [i], [ii], [iii] and [iv] we get,
AB + BC + BC + CD + CD + DA + DA + AB > CA + DB + AC + DB
2AB + 2BC + 2CD + 2DA > 2CA + 2DB
Take out 2 on both the side,
2(AB + BC + CA + DA) > 2(CA + DB)
AB + BC + CA + DA > CA + DB
Hence, the given expression is true.
5 We know that,
The sum of the length of any two sides is always greater than the third side.
Now consider the ΔPAB,
Here, PA + PB < AB … [equation i]
Then, consider the ΔPBC
Here, PB + PC < BC … [equation ii]
Consider the ΔPCD
Here, PC + PD < CD … [equation iii]
Consider the ΔPDA
Here, PD + PA < DA … [equation iv]
By adding equation [i], [ii], [iii] and [iv] we get,
PA + PB + PB + PC + PC + PD + PD + PA < AB + BC + CD + DA
2PA + 2PB + 2PC + 2PD < AB + BC + CD + DA
2PA + 2PC + 2PB + 2PD < AB + BC + CD + DA
2(PA + PC) + 2(PB + PD) < AB + BC + CD + DA
From the figure we have, AC = PA + PC and BD = PB + PD
Then,
2AC + 2BD < AB + BC + CD + DA
2(AC + BD) < AB + BC + CD + DA
Hence, the given expression is true.
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