June 11, 2015 by deepika in Non-Verbal Reasoning
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Ninety one small cubes of same size are arranged in two cubes of sides 4 and 3 cm. each. The bigger cube is colored red on two opposite faces, white on two adjacent faces, and blue on the remaining faces while the smaller one is colored white on two opposite faces, blue on two adjacent faces and red on the remaining faces. Taking both the cubes into consideration, answer the question based on the above information. How many cubes are colored blue, red or white on two faces each and not colored on any other face?
Ninety one small cubes of same size are arranged in two cubes of sides 4 and 3 cm. each. The bigger cube is colored red on two opposite faces, white on two adjacent faces, and blue on the remaining faces while the smaller one is colored white on two opposite faces, blue on two adjacent faces and red on the remaining faces. Taking both the cubes into consideration, answer the question based on the above information. How many cubes are colored red, white or blue on one face each and have no other colored face?
Ninety one small cubes of same size are arranged in two cubes of sides 4 and 3 cm. each. The bigger cube is colored red on two opposite faces, white on two adjacent faces, and blue on the remaining faces while the smaller one is colored white on two opposite faces, blue on two adjacent faces and red on the remaining faces. Taking both the cubes into consideration, answer the question based on the above information. How many cubes are colored blue on at least one face?
Ninety one small cubes of same size are arranged in two cubes of sides 4 and 3 cm. each. The bigger cube is colored red on two opposite faces, white on two adjacent faces, and blue on the remaining faces while the smaller one is colored white on two opposite faces, blue on two adjacent faces and red on the remaining faces. Taking both the cubes into consideration, answer the question based on the above information. How many cubes have at least one white face?
Ninety one small cubes of same size are arranged in two cubes of sides 4 and 3 cm. each. The bigger cube is colored red on two opposite faces, white on two adjacent faces, and blue on the remaining faces while the smaller one is colored white on two opposite faces, blue on two adjacent faces and red on the remaining faces. Taking both the cubes into consideration, answer the question based on the above information. How many cubes have at least colored on two faces only?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes in the second layer from the top do not have any colored face?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes in the third layer have at least two colored face each?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes in the fourth layer from the top have only one colored face each?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes in the bottom layer have at least one colored face each?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes in top four layers taken together have only one colored face each?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes do not have any colored face?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes have three colored faces each?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes have only two colored face each?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes have only two colored face each?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes have only one colored face each?
One hundred and twenty five small cubes of equal size are arranged in solid pile of dimensions 5*5*5. Then from one corner one cube is removed from the top. From the opposite corner 8 cubes*2*2*2) are removed from the third corner a column of three cubes and from the fourth corner a column of four cubes are removed. The remaining solid is colored red on all the exposed faces. Now answer the following question. How many cubes are there in top layer?
The six faces of a cube are colored black, brown, green, red white and blue in the following ways:
a. Red is opposite to black.
b. Brown is adjacent to blue.
c. Blue is adjacent to white.
d. Red is at the bottom surface.
e. Green is between red and black.
Now answer the following question based on this information. The four adjacent colours are
The six faces of a cube are colored black, brown, green, red white and blue in the following ways:
(i) Red is opposite to black.
(ii) Brown is adjacent to blue.
(iii) Blue is adjacent to white.
(iv) Red is at the bottom surface.
(v) Green is between red and black.
Now answer the following question based on this information. Which of the following can be deducted from the information given in the question?
The six faces of a cube are colored black, brown, green, red white and blue in the following ways:
(i) Red is opposite to black.
(ii) Brown is adjacent to blue.
(iii) Blue is adjacent to white.
(iv) Red is at the bottom surface.
(v) Green is between red and black.
Now answer the following question based on this information. Which colour is opposite to Brown colour?
Three adjacent faces of a cube are colored blue. The cube is then cut once horizontally and once vertically to form cuboids of equal size. Each of these cuboids is colored pink on all the uncolored faces and is then cut (as before) into four cuboid of equal size. How many Cuboids have two faces colored pink?
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