Math, asked by Anonymous, 3 months ago

3 girls reshma,salma and mandeep r playing a game by standing on a circle of
radius 5m drawn in a park.Reshma throws ball to salma and salma to mandip,Mandip to reshma.If the distance betwwen reshma and salma;salma and mandip is 6m each,what is the distance between Reshma and Mandip?​

Answers

Answered by mathdude500
0

Answer:

\boxed{ \sf{ \:Distance\:between\:Reshma\:and\:Mandeep \: is \: 9. 6 \: m  \: }}\\  \\

Step-by-step explanation:

Given that, Three girls Reshma, Salma and Mandeep are playing a game by standing on a circle of radius 5m drawn in a park. Reshma throws a ball to Salma, Salma to Mandeep, Mandeep to Reshma.

Let assume that A, B and C represents the position of theee girls Reshma, Salma and Mandeep on a circle of radius 5 cm. Let assume that O be the center of circle.

Construction : Join AB, BC, AC, OB and OA.

So, it is given that AB = BC = 6 m and OA = OB = 5m.

Further, As AB = BC, so draw angle bisector of angle ABC.

So, angle bisector passes through center of circle O and is perpendicular bisector of AC. Let it intersects AC at D.

\sf\implies \sf \: AD = DC = x \: (say) \\  \\

Let assume that OD = y

Now, In right-angle triangle OAD

Using Pythagoras Theorem, we have

\sf \:  {OA}^{2} =  {OD}^{2} +  {AD}^{2}  \\  \\

\sf \:  {5}^{2} =  {y}^{2} +  {x}^{2}  \\  \\

\sf\implies \sf \:  {x}^{2} +  {y}^{2}  = 25 -  -  - (1) \\  \\

Now, In right-angle triangle ABD

By using Pythagoras Theorem, we have

\sf \:  {AB}^{2} =  {BD}^{2} +  {AD}^{2}  \\  \\

\sf \:  {6}^{2} =  {(5 - y)}^{2} +  {x}^{2}  \\  \\

\sf \:  36 =  25 +  {y}^{2} - 10y  +  {x}^{2}  \\  \\

\sf \:  36 =  25 - 10y  +  ({x}^{2} +  {y}^{2})   \\  \\

\sf \:  36 =  25 - 10y  +  25 \:  \:  \:  \: \boxed{ \sf{ \: \because \: {x}^{2} +  {y}^{2} = 25 \: }}   \\  \\

\sf \:  36 =  50 - 10y   \\  \\

\sf \:  10y =  50 - 36   \\  \\

\sf \:  10y =  14   \\  \\

\sf\implies  \: y =  \dfrac{14}{10} =  \dfrac{7}{5}  \: m \\  \\

On substituting the value of y in equation (1), we get

\sf \:  {x}^{2} +  {\bigg(\dfrac{7}{5}  \bigg) }^{2} = 25 \\  \\

\sf \:  {x}^{2} +  \dfrac{49}{25}  = 25 \\  \\

\sf \:  {x}^{2} = 25 -  \dfrac{49}{25}  \\  \\

\sf \:  {x}^{2} = \dfrac{625 - 49}{25}  \\  \\

\sf \:  {x}^{2} = \dfrac{576}{25}  \\  \\

\sf \:  {x}^{2} =  {\bigg(\dfrac{24}{5}  \bigg) }^{2}   \\  \\

\sf\implies  \: x = \dfrac{24}{5}  \: m \\  \\

Now,

\sf \: AC=2AD \\  \\

\sf \: AC=2x \\  \\

\sf \: AC=2 \times \dfrac{24}{5}  \\  \\

\sf \: AC= \dfrac{48}{5}  \\  \\

\sf\implies \sf \: AC= 9. 6 \: m \\  \\

Hence,

\sf\implies \: Distance\:between\:Reshma\:and\:Mandeep \: is \: 9. 6 \: m \\  \\

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