Pair of opposite faces of a solid cube having sides $3 \mathrm{cm}$ are painted black, blue and yellow respectively. After the painting this cube is divided into smaller cubes of side $1 \mathrm{cm}$. How many smaller cubes have only one face painted?

A cube which is painted red on the outer surface is of $2 \mathrm{inches}$ height, $2 \mathrm{inches}$ wide and $2 \mathrm{inches}$ across. If it is cut into one inch cubes as shown by dotted lines, then indicate the number of cubes which are painted red only on two sides?

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A cube is coloured red on all of its faces. It is then cut into $64$ smaller cubes of equal size. The smaller cubes so obtained are now separated.

How many smaller cubes have no face coloured?

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A cube is coloured red on all of its faces. It is then cut into $64$ smaller cubes of equal size. The smaller cubes so obtained are now separated.

How many smaller cubes will have at least two surfaces painted with red colour?

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A cube is coloured red on all of its faces. It is then cut into $64$ smaller cubes of equal size. The smaller cubes so obtained are now separated.

How many smaller cubes have two surfaces painted with red colour?

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A cube is coloured red on all of its faces. It is then cut into $64$ smaller cubes of equal size. The smaller cubes so obtained are now separated.

How many smaller cubes have only $3$ surfaces painted with red colour?

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A cube is painted red on two adjacent surfaces and black on the surfaces opposite to red surfaces and green on the remaining surfaces. Now, the cube is cut into 64 smaller cubes of equal size.

How many smaller cubes have only one surface painted?

A cube is painted red on two adjacent surfaces and black on the surfaces opposite to red surfaces and green on the remaining surfaces. Now, the cube is cut into 64 smaller cubes of equal size.

How many smaller cubes will have no surface painted?