Math, asked by kashafzainabp2a, 3 months ago

04 The walls around a ground measure 82 m. If one wall along the breadth is 20 m.
What is the measurement along other wall of the ground​

Answers

Answered by MissSparks
15

Given: The walls around a ground measure 82 m. If one wall along the breadth is 20 m.

Need to find: Measurement along other wall of the ground.

❍ Let r and h be the radius and Height of the cylinder respectively.

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\underline{\boldsymbol{According\: to \:the\: Question :}}

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The sum of the radius and height of a cylinder is 37 cm.

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Therefore,

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:\implies\sf r + h = 37 \qquad\quad\bigg\lgroup\bf Equation\;(I)\bigg\rgroup

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\underline{\bf{\dag} \:\mathfrak{As\;we\;know\: that\: :}}⠀⠀⠀⠀

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\star\;\boxed{\sf{\pink{TSA_{\:(cylinder)} = 2\pi r (h + r)}}}

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where,

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r is radius of the cylinder and h is the height of the cylinder. And the TSA(Total surface area) of the cylinder is given that is 1628 cm². Now, Comparing,

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:\implies\sf 2 \pi r(h + r) = 1628 \\\\\\:\implies\sf 2 \pi r(37) = 1628 \\\\\\:\implies\sf  2 \times \dfrac{22}{7} \times r \times 37 = 1628\\\\\\:\implies\sf  r = \dfrac{\cancel{1628}\; \times 7}{2 \times \;\cancel{22}\; \times 37}  \\\\\\:\implies\sf r = \dfrac{814 \times 7}{2 \times 11 \times 37} \\\\\\:\implies\sf  r  = \cancel\dfrac{5698}{814}\\\\\\:\implies{\underline{\boxed{\frak{\pink{r = 7\;cm}}}}}\;\bigstar

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\underline{\bf{\dag} \:\mathfrak{By\;using\; Equation\;(1)\: :}}⠀⠀⠀⠀

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:\implies\sf r + h = 37 \\\\\\:\implies\sf h = 37 - r \\\\\\:\implies\sf h = 37 - 7 \\\\\\:\implies{\underline{\boxed{\frak{\pink{h = 30\;cm}}}}}\;\bigstar

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\therefore{\underline{\sf{Hence, \; radius\;and\; height\;of\; cylinder\;are\; \bf{7cm\;and\;30cm }.}}}

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★ To calculate the Volume of cylinder formula is given by :

\star\;\boxed{\sf{\purple{Volume_{\:(cylinder)} = \pi r^2h}}}

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:\implies\sf Volume_{\:(cylinder)} = \pi r^2 h\\\\\\:\implies\sf  Volume_{\:(cylinder)} = \dfrac{22}{\cancel{\;7}} \times \cancel{\;7} \times 7 \times 30\\\\\\:\implies\sf  Volume_{\:(cylinder)} = 22 \times 7 \times 30 \\\\\\:\implies\sf  Volume_{\:(cylinder)} = 22 \times 210\\\\\\:\implies{\underline{\boxed{\frak{\purple{Volume_{\:(cylinder)} = 4620\;cm^3}}}}}\;\bigstar

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\therefore{\underline{\sf{Hence,\; volume\;of\; cylinder\;is\; \bf{ 4620\; cm^3}.}}}

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