Math, asked by free86, 7 months ago

A large cube is formed from the material obtained by melting three smaller cubes of 3, 4 and 5 cm side. what is the ratio of the total surface areas of the smaller cube to the large cube?​

Answers

Answered by Anonymous
1

\huge\underline\bold {Answer:}

Let x be the edge of the large cube. Then,

x {}^{3}  + 3 {}^{3}  +  {4}^{3}  +  {5}^{3}  \\  =  > x {}^{3}  = 27 + 64 + 125 \\  = 216

 =  > x =   \sqrt[3]{216}  = 6 \: cm

Therefore required ratio

= Total surface area of smaller cubes ÷ Surface area of larger cube

 =  \frac{6(3) {}^{2} + 6(4) {}^{2} + 6 ({5})^{2}   }{ 6(6) {}^{2} }

 =  \frac{6 \times 9 + 6 \times 16 + 6 \times 25}{6(6) {}^{2} }

 =  \frac{54 + 96 + 150}{216}  \\   \\ =   \frac{300}{216}  \\  \\  \\  =  \frac{25}{18}

= 25 : 18.

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