Click Here To Edit Arithmetic 11. Dec 1794

Square root means
the root of the
square: not a figure root
of a square form,
but the root of a
figure of a square
form.

The ambiguity arises
from the double
signification of
the word square,
having either a substantive
or an adjective,
Then In
the above expression
square root it appears
to be used
shews at first sight
as if used adjectively
(that being its
original signification)
whereas it
is intended to be
taken substantively
The square root,
just as
meaning the root
of the square, just
as we say the Parish
Priest, meaning
the Priest of
the Parish.

By means of this
ambiguity the
same sort of perplexity
is produced
as would be produced
if meaning to the stile
a particular man
the Man of the Green,
we were to speak of
him by the name of
the green man.

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So the Cube Root ,
means the root of
the Cube.

A Square number
is so called from
this circumstance,
from this property
belonging to it, that
supposing the units
denoted by it to
be squares, they
would, taken together,
be capable
of being arranged
in the form of a
square: which is
not the case of with
any number that
is not a square.
Thus 4 is a square
number: for 4 equal
squares are capable
of being arranged in
the form of a square.
For the same reason
so is 9: so isare 16,
25 &c. Whereas
at the same time
that no numberthat property
between is not found
in any of the intermediate
numbers.
You can not make
a square out of two
squares: nor out of
3 squares: nor out
of 5 squares; nor
out of 6,7, 8, 10,
11,12,13,14,15, or
17 squares, and so
on.

Four being a square number, 2 is the square root of that number: that is 4 being such a number that a set of squares composed of such a number of squares are capable of being placed in form of a square, when that form is produced [+], two of those compound squares will form the seat bottom, base, or root as it may be called of such a square. A square number may accordingly therefore be defined, any number of which the component units if squares, are capable of being arranged in form of a square without any interstices, in the form of a square.