Find the total number of cubes in the given figure?
(Total numbers of cubes in a line x Number of stack / tower) + ...
= (6x1)+(5x2)+(4x3)+(3x4)+(5x2)+(6x1)
= 6+10+12+12+10+6 = 56
Count the number of cubes in the given figure.
In the figure, there are
5 columns containing 4 cubes each;
33 columns containing 3 cubes each;
9 columns containing 2 cubes each and 3 columns containing 1 cube each.
Total Number of cubes = ( 5 x 4) + (33 x 3) + (9 x 2) + (3 x 1) = 20 + 99 + 18 + 3 = 140
Three positions of a cube are shown below. What will come opposite to face containing '$'?
Select the Answer figure that fits in the blank space in the given problem figure.
How many triangles are there in the following figure?
In the question, a word is represented by only one set of numbers as given in any one of the alternatives. The sets of numbers given in the alternatives are represented by two classes of alphabets as in two matrices given below. The columns and rows of Matrix I are numbered from 0 to 4 and that of Matrix II are numbered from 5 to 9. A from these matrices can be represented first by its row and next by its column. e.g. 'K' can be represented by 42, 34 etc. and 'Z' can be represented by 76, 59, etc. You have to identify the set for the word 'SELF'.
We know that Cubes with no surface painted can be find using , where x is number of cuttings. Here x=6.
Choose the box that is similar to the box formed from the given sheet of paper (A).
(A)
When the sheet in fig. (A) is folded, then one of the faces of the cube formed will be of the form and this face will lie opposite the face bearing a square. Also, one of the blank faces lies opposite another blank face and the third blank face lies opposite the face bearing an '=' sign. Clearly, all the three blank faces cannot appear adjacent to each other. So, the cube shown in fig. (2) which has all the three blank faces adjacent to each other cannot be formed. Hence, only the cubes shown in figures A, C and D can be formed.
Count the number of cubes in the given figure.
In the figure, there are 34 columns containing 2 cubes each.
Total number cubes = (34 x 2) = 68
Count the number of cubes in the given figure.
Clearly, there are 4 columns containing 1 cube each, 4 columns containing 2 cubs each and 1 column containing 3 cubes.
Hence, there are (4 x 1) + (4 x 2) + (1 x 3) = 4 + 8 + 3 = 15 cubes in the given figure.
Count the number of cubes in the given figure.
In the figure, there are 9 columns containing 5 cubes each, 7 columns containing 4 cubes each, 5 columns containing 3 cubes each and 1 column containing 1 cube.
Total number of cubes = (9 x 5) + (7 x 4) + (5 x 3) + (1 x 1) = 89
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