Based on the excerpt, which statement best describes the author's attitude toward Alexander Graham Bell? The author greatly dislikes Bell for taking credit for the
invention of the telephone.

The author feels pity for Bell because he is not the
real inventor of the telephone.

The author celebrates Bell even though he gives him
only partial credit for the telephone.

The author feels it is important to show that Bell was not the true inventor of the telephone.

Plz someone who does edge help me. Plz don’t just use another answer from here

In mathematics, a square number or perfect square is an integer that is the square of an integer;[1] in other words, it is the product of some integer with itself. For example, 9 is a square number, since it equals 32 and can be written as 3 × 3.

The usual notation for the square of a number n is not the product n × n, but the equivalent exponentiation n2, usually pronounced as "n squared". The name square number comes from the name of the shape. The unit of area is defined as the area of a unit square (1 × 1). Hence, a square with side length n has area n2. In other words, if a square number is represented by n points, the points can be arranged in rows as a square each side of which has the same number of points as the square root of n; thus, square numbers are a type of figurate numbers (other examples being cube numbers and triangular numbers).

Square numbers are non-negative. Another way of saying that a (non-negative) integer is a square number is that its square root is again an integer. For example, {\displaystyle {\sqrt {9}}=3,}{\displaystyle {\sqrt {9}}=3,} so 9 is a square number.

A positive integer that has no perfect square divisors except 1 is called square-free.

For a non-negative integer n, the nth square number is n2, with 02 = 0 being the zeroth one. The concept of square can be extended to some other number systems. If rational numbers are included, then a square is the ratio of two square integers, and, conversely, the ratio of two square integers is a square, for example,

Starting with 1, there are {\displaystyle \lfloor {\sqrt {m}}\rfloor }\lfloor \sqrt{m} \rfloor square numbers up to and including m, where the expression {\displaystyle \lfloor x\rfloor }\lfloor x\rfloor  represents the floor of the number x.

Step-by-step explanation: