Answer: The new cube will become 4 times larger.
Step-by-step explanation: To determine what happens to the surface area of a cube if we double the length of a side, let's start by choosing a length for the side of our cube.
For example, let's say our cube has a side length of 2. Next, to find its surface area we simply add the areas of the faces of the cube. Since each face of the cube is a square with a side length of 2, the area of each face is 2 multiplied by 2 which is 4. Since there are 6 square faces in a cube, we multiply 6 by 4 to get 24 which represents the surface area of the cube.
Now, let's double the length of a side so each side will have a side length of 4. Since each face of the cube is a square with a side length of 4, the area of each face is 4 multiplied by 4 which is 16. Since there are 6 square faces in a cube, we multiply 6 by 16 to get 96 which represents the surface area of our new cube.
Finally, notice that our new cub has a surface area that is 4 times the surface area of the old cube.
Therefore, if we double the length of a side, we can see that the surface area becomes 4 times larger.
I'll attach an image to show the cubes and the surface area.