Given that there exists a triangle whose sides are a,b,c. Then prove that there exists a triangle whose $\sqrt{a}, \sqrt{b}, \sqrt{c}$ $sqrta,sqrtb,sqrtc$ ?

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Given that there exists a triangle whose sides are a,b,c. Then prove that there exists a triangle whose $\sqrt{a}, \sqrt{b}, \sqrt{c}$ $sqrta,sqrtb,sqrtc$ ?

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Answer 1 · 2018-07-23T03:33:25

Given that there exists a triangle whose sides are a,b,c.

So we have following 3 inequalities satisfied.

$a + b > c$ $a+b>c$
$b + c > a$ $b+c>a$
$c + a > b$ $c+a>b$

Considering the first one

$a + b > c$ $a+b>c$

$\Rightarrow {(\sqrt{a} + \sqrt{b})}^{2} - 2 \sqrt{a b} > c$ $=>(sqrta+sqrtb)^2-2sqrt(ab)>c$

$\Rightarrow {(\sqrt{a} + \sqrt{b})}^{2} > c + 2 \sqrt{a b}$ $=>(sqrta+sqrtb)^2>c +2sqrt(ab)$

$\Rightarrow \sqrt{a} + \sqrt{b} > \sqrt{c}$ $=>sqrta+sqrtb>sqrtc$

Similarly from 2nd inequality we get

$\sqrt{b} + \sqrt{c} > \sqrt{a}$ $sqrtb+sqrtc>sqrta$

And from 3rd inequality we get

$\sqrt{c} + \sqrt{a} > \sqrt{b}$ $sqrtc+sqrta>sqrtb$

So we can say if there exists a triangle having sides $a, b and c$ $a,bandc$ then there exists a triangle having sides $\sqrt{a}, \sqrt{b} and \sqrt{c}$ $sqrta,sqrtbandsqrtc$

Answer 2 · 2018-07-24T00:43:53

My interest in the problem:

Explanation:

Choosing $a = 2, b = 4 and c = 3$ $a = 2, b = 4 and c = 3$ , and using scale and compass

only, four conjoined $△ s D E F$ $triangles DEF$ ,

with sides $\sqrt{a} = \sqrt{2}, \sqrt{b} = 2 and \sqrt{c} = \sqrt{3}$ $sqrta = sqrt2, sqrt b = 2 and sqrt c = sqrt3$ are constructed.

The graph shows one pair over the base $E F = \sqrt{2}$ $EF = sqrt2$ ,

with vertices.

$D (\frac{1}{\sqrt{8}}, \pm \sqrt{\frac{23}{8}}), E (0, 0) and F (\sqrt{2}, 0)$ $D ( 1/sqrt 8, +-sqrt (23/8) ), E ( 0, 0 ) and F ( sqrt2, 0 )$

There are three such pairs, and all have the central

common $△ D E F$ $triangle DEF$

graph{(x^2+y^2-3)((x-sqrt2)^2+y^2-4)(x^2+y^2-0.01)((x-sqrt2)^2+y^2-0.01)((x-sqrt(1/8))^2+(y-sqrt((23)/8))^2-0.01)((x-sqrt(1/8))^2+(y+sqrt((23)/8))^2-0.01)=0[-4 4 -2 2]}

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Given that there exists a triangle whose sides are a,b,c. Then prove that there exists a triangle whose $\sqrt{a}, \sqrt{b}, \sqrt{c}$ $sqrta,sqrtb,sqrtc$ ?

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Explanation:

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