English, asked by Anonymous, 4 months ago

the diameter of a 120 cm long roller is 84 cm It takes 1000 complete revolutions in moving once over to level a playground what is the area of the playground​ ​

Answers

Answered by prabhas24480
1

here you can radius = 84/ 2 cm = 42 cm & roller=120 or, area of the roller = 2πrh 

= 2 × 22/ 7 × 42 × 120 cm2 = 44 × 720 cm2= 31680 cm2 

∴ area covered by the roller in 1 revolution = 31680 cm2 

∴ area covered by the roller in 500 revolutions = 31680 × 500 cm2 = 15840000 cm

therefore area = 15840000/ 100× 100 m2 = 1584 m2 Ans.

Answered by ItzCaptonMack
27

\huge\mathtt{\fbox{\red{Answer✍︎}}}

\large\underline\mathfrak{\red{GIVEN,}}

\sf\dashrightarrow \blue{height(H)= 120cm }

\sf\dashrightarrow \blue{diameter of roller= 84cm}

\sf\therefore \blue{radius= \dfrac{diameter}{2}}

\sf\dashrightarrow \blue{ \dfrac{84}{2}}

\sf\dashrightarrow \blue{\cancel \dfrac{84}{2}}

\sf\dashrightarrow  \blue{radius= 42cm}

\large\underline\mathfrak{\purple{TO\:FIND,}}

\sf\dashrightarrow \red{AREA\: OF\:PLAYGROUND }

FORMULA

\rm{\boxed{\sf{  \circ\:\: C.S.A\: OF\: CYLINDER= 2 \pi rh \:\: \circ}}}

\large\underline\mathtt{\purple{SOLUTION,}}

© ATQ,

\purple{\text{AREA COVERED BY ROLLER IN 1 REVOLUTION = PERIMETER OF ROLLER}}

\sf\therefore \pink{AREA \:COVERED \:IN\: ONE\: REVOLUTION= 2 \pi r h}

\sf\implies \red{ 2 \times \dfrac{22}{7} \times 42 \times 120}

\sf\implies \blue{ 2 \times \dfrac{22}{\cancel{7}} \times \cancel{42} \times 120}

\sf\implies \red{2 \times 22 \times 6 \times 120}

\sf\implies \blue{ 44 \times 72  }

\sf\implies \pink{ 31680cm^2 }

\rm{\boxed{\sf{ \circ\:\: 31680cm^2\:\: \circ}}}

\sf\therefore \purple{ THE\:ROLLER\:TAKES\:1000\: REVOLUTIONS  TO\:COVER\:AREA\:OF\:THAT\: PARTICULAR\:PALAYGROUND}

\sf\therefore \blue{we\: know,\: to\: complete\: one  \:revolution\: it \:takes \:31680cm^2 \:area }

\sf\therefore \red{then \:area \:of\:rectangle = 1000 \times  the \:area\: in\: one\: complete\: revolution}

\sf\implies \pink{ 1000 \times 31680  }

\sf\implies  \green{31680000cm^2}

CONVERSION,

\sf\therefore \green{cm^2 \:into\:m^2}

\sf\therefore \blue{\dfrac{ 31680000}{ 100 \times 100}}

\sf\implies \red{\cancel \dfrac{ 31680000}{ 100 \times 100}}

\sf\implies \orange{3168 m^2}

\rm{\boxed{\sf{ \circ\:\:  AREA\:OF\: PLAYGROUND= 3168m^2 \:\: \circ}}}

\rm\underline\mathrm{AREA\:OF\:PLAYGROUND\:IS\:3168cm^2}

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