Use several same cubes to build a geometry. The three views of the geometry are shown in the figure. Then the minimum number of cubes needed to build the geometry is () A. 8B. 7C. 6D. 5

Use several same cubes to build a geometry. The three views of the geometry are shown in the figure. Then the minimum number of cubes needed to build the geometry is () A. 8B. 7C. 6D. 5

From the meaning of the title, we can see that the three view restoration geometry is four small cubes in the lower layer and two cubes in the upper layer. As shown in the figure, the minimum number of small cubes needed to build the geometry is 7

Give you three views of this figure. How do you know how many layers the geometry has? How many cubes does the geometry prompt
I hope you can help me

It's hard to say. It's related to your spatial imagination,
It seems that you need to exercise and strengthen your spatial imagination

As shown in the figure, it is a three view of a geometry composed of several identical small cubes, then the number of small cubes that make up the geometry is______ ．

According to the three views, the drawing is as follows: then the number of small cubes that make up the geometry is: 1 + 3 + 1 + 1 + 1 + 2 = 9; so the answer is: 9