The expression -4(b²) represents a value rather than a geometric shape, so it doesn't have physical dimensions like a square would. However, if you were referring to a square whose area is represented by -4(b²), it would imply a square with side length equal to the square root of -4(b²). Since the area cannot be negative in real numbers, this suggests the expression is contextually related to complex numbers, where dimensions might not apply in the conventional sense.
The dimensions of square feet is Length2 or L2
There are 2 dimensions in a square, length and width, which are always the same, due to the nature of a square.
Being a square, all the linear dimensions are identical, the square root of 25.
14' square
The dimensions will be square feet.
The dimensions are: The dimensions of the square are LW Length x width (srry about the last one)
12b3
The dimensions of square feet is Length2 or L2
That is because a cube has 3 dimensions, and a square has 2.That is because a cube has 3 dimensions, and a square has 2.That is because a cube has 3 dimensions, and a square has 2.That is because a cube has 3 dimensions, and a square has 2.
There are 2 dimensions in a square, length and width, which are always the same, due to the nature of a square.
how big is time square
Being a square, all the linear dimensions are identical, the square root of 25.
The dimensions are square feet or [Length2]
4(16a4 + b2)
(2b - 1)(2b + 1)
14' square
4b2-16 =4(b2-4) =4(b+2)(b-2)