No.
Wiki User
∙ 11y agoThere's no such thing as "a square with different sizes". I'm thinking that youmust have meant "two squares with different sizes". The answer is still "no".
Yes. Just add the same number to each square and see what happens. Also, there are magic squares of different sizes.
no
They are not usually the same.
similarity
There's no such thing as "a square with different sizes". I'm thinking that youmust have meant "two squares with different sizes". The answer is still "no".
They may be of different sizes. Congruent figures have the same size.They may be of different sizes. Congruent figures have the same size.They may be of different sizes. Congruent figures have the same size.They may be of different sizes. Congruent figures have the same size.
Yes. Just add the same number to each square and see what happens. Also, there are magic squares of different sizes.
6 squares of the same sizes are needed to build a 3 dimensional cube
No, because even through they have the same perimeter you must show how you can get 16 as the perimeter in two different ways.
When two plane mirrors of the same size are placed at different angles to each other, the size of the images they create can appear different due to the way light reflects off them. The angle of incidence and reflection will affect how the rays of light bounce off the mirrors, resulting in variations in the size of the reflected images. Additionally, the position of the observer relative to the mirrors can also impact the perceived size of the images.
Yes and No, all squares will have the same internal angels (90 degrees) making them similar, but dimensions of squares can be different (how long the sides are).
No !
no
The square of the number of tiles on each row or column. Generally a chess board has 64 squares. This answer given above by one of our friends is true only incase of squares of same size. But as we consider all possible squares of different sizes, then it will be calcualted using the formula, 12+22+32+42+52+62+72+82
They are not usually the same.
similarity