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<p><!-- Red ink -->To add decimals wherein <lb/> | |||
are single reptends—</p> | |||
<p>Make every line end at <lb/> | |||
the same place filling up <lb/> | |||
the vacancies by the repeating <lb/> | |||
digits and annexing <lb/> | |||
a cypher or cyphers <lb/> | |||
to the finite terms then <lb/> | |||
add as before only increase <lb/> | |||
the sum of the right hand <lb/> | |||
row with as many units <lb/> | |||
as it contains nines & <lb/> | |||
the figure in the Sum <lb/> | |||
under that place will be <lb/> | |||
a repetend—</p> | |||
<p><!-- Red ink -->To subtract finite decimals.</p> | |||
<p>Having first set down the <lb/> | |||
greater the two numbers <lb/> | |||
given whether it be a whole <lb/> | |||
number mixed number or <lb/> | |||
decimal set down the less <lb/> | |||
under it according to the <lb/> | |||
directions given in addition <lb/> | |||
then subtract as in whole <lb/> | |||
numbers imagining all <lb/> | |||
the vacant places filled <lb/> | |||
with cyphers.—</p> | |||
<p><!-- Red ink -->To subtract decimals that <lb/> | |||
have repetends.—</p> | |||
<p>Make the repetends similar <lb/> | |||
and conterminous & <lb/> | |||
subtract as in the last <lb/> | |||
case observing only if the <lb/> | |||
repetend of the number to <lb/> | |||
be subtracted be greater <lb/> | |||
than the repetend of the <lb/> | |||
number it is to be taken <lb/> | |||
from then the right hand <lb/> | |||
figure of the remainder <lb/> | |||
must be less by unity <lb/> | |||
than it would be if the <lb/> | |||
expressions were finite & <lb/> | |||
the repetend in the remainder <lb/> | |||
will consist of as many <lb/> | |||
places as there are in <lb/> | |||
the other two numbers.—</p> | |||
<pb/> | |||
<p><!-- Red ink -->When both factors are <lb/> | |||
finite decimals whether <lb/> | |||
they are single or joined <lb/> | |||
with integers,</p> | |||
<p>Multiply them as <lb/> | |||
if they were all whole numbers <lb/> | |||
and from the product <lb/> | |||
towards the right hand cut <lb/> | |||
off so many places for <lb/> | |||
decimal parts in the <lb/> | |||
product as there were <lb/> | |||
in both the multiplier & <lb/> | |||
multiplicand counted together<lb/> | |||
but if it so happen <lb/> | |||
that there are not so many <lb/> | |||
places in the product <lb/> | |||
supply the defect by prefixing <lb/> | |||
cyphers.—</p> | |||
<p><!-- Red ink -->Two decimal fractions <lb/> | |||
being given to reserve in <lb/> | |||
their product any assigned<lb/> | |||
number of places.—</p> | |||
<p>Sets the Units place <lb/>of the multiplier directly <lb/> | |||
under that figure of the <lb/> | |||
decimal part of the multiplicand <lb/> | |||
whose place <lb/> | |||
you would reserve in the <lb/> | |||
product and insert the <lb/> | |||
order of all its other places <lb/> | |||
that is <del>the</del> write the decimals <lb/> | |||
on the left hand <lb/> | |||
and the integers if any <lb/> | |||
on the right.—</p> | |||
<p>Then in multiplying <lb/> | |||
always begin at that <lb/> | |||
figure of the multiplicand <lb/> | |||
which stands over the <lb/> | |||
figure wherewith you are <lb/> | |||
then multiplying setting <lb/> | |||
down the first figure of <lb/> | |||
each particular product <lb/> | |||
directly underneath one <lb/> | |||
another due regard being <lb/> | |||
had to the increase <add>which</add><lb/><pb/> | |||
<p>which would arise out <lb/> | |||
of the two next figures <lb/> | |||
to the right hand of that <lb/> | |||
figure in the multiplicand <lb/> | |||
which you then begin with <lb/> | |||
carrying one from 5 to <lb/> | |||
15 two from 15 to 25 three <lb/> | |||
from 25 to 35 four from <lb/> | |||
35 to 45 &c and the Sum <lb/> | |||
of these lines will give <lb/> | |||
the product.—</p> | |||
<p>In any of the following <lb/> | |||
cases in division if the <lb/> | |||
dividend be greater than <lb/> | |||
the divisor the quotient <lb/> | |||
will be either a whole or <lb/> | |||
a <sic>mixt</sic> number but <lb/> | |||
when the dividend is less <lb/> | |||
than the divisor the quotient <lb/> | |||
must necessarily be <lb/> | |||
a fraction for a less number <lb/> | |||
is contained in a greater <lb/> | |||
once at the least but <lb/> | |||
the greater is not contained <lb/> | |||
once in the less.—</p> | |||
<p><!-- Red ink -->When the divisor & <lb/> | |||
dividend are both finite <lb/> | |||
decimals</p> | |||
<p>Divide as in whole <lb/> | |||
numbers and from the <lb/> | |||
right hand of the quotient<lb/> | |||
points off for decimals so <lb/> | |||
many places as the decimal <lb/> | |||
places in the dividend <lb/> | |||
exceed those in the <lb/> | |||
divisor and those to the <lb/> | |||
left if any are integers <lb/> | |||
but if the places of the <lb/> | |||
quotient are not so many <lb/> | |||
as this rule requires <lb/> | |||
supply the defect by prefixing <lb/> | |||
cyphers to the quotient <lb/> | |||
but if the decimal places <lb/> | |||
in the divisor be more <lb/> | |||
than those in the dividen <add>annex</add><lb/><pb/> | |||
annex cyphers to the dividend <lb/> | |||
to make them equal and <lb/> | |||
the quotient will be integers <lb/> | |||
until all those cyphers <lb/> | |||
are used.—</p> | |||
<p><!-- Red ink -->To contract the work of <lb/> | |||
division when the divisor <lb/> | |||
consists of many decimal <lb/> | |||
places.—</p> | |||
<p>Having determined the <lb/> | |||
value of the quotient figures <lb/> | |||
let each remainder be a <lb/> | |||
now a dividend and for <lb/> | |||
every such dividend point <lb/> | |||
off one figure from the <lb/> | |||
right of the divisor observing <lb/> | |||
at each multiplication <lb/> | |||
to have regard to increase <lb/> | |||
of the figures so cut <lb/> | |||
off as in contracted <lb/> | |||
multiplication.—</p> | |||
<p>If any whole mixed <lb/> | |||
or decimal number is <lb/> | |||
given to be divided by <lb/> | |||
10, 100, 1000 &c only remove <lb/> | |||
the separating point towards <lb/> | |||
the left hand so many <lb/> | |||
places as there are cyphers <lb/> | |||
in the divisor also in <lb/> | |||
multiplication the separating <lb/> | |||
point is moved to the <lb/> | |||
ri<lb/>ght hand so many <lb/> | |||
places are there cyphers <lb/> | |||
in the multiplier.—</p> | |||
<p><!-- Red ink -->If the dividend be a <lb/> | |||
repetend.—</p> | |||
<p>If it be a single <lb/> | |||
repetend being down the <lb/> | |||
circulating figure until <lb/> | |||
the quotient either repeats <lb/> | |||
or is as exact as required <lb/> | |||
but if the repetend in the <lb/> | |||
dividend be a compound <lb/> | |||
one then being down the <lb/> | |||
circulating figures in the <lb/> | |||
same order they stand in <lb/> | |||
and when you have got <add>thro'</add><lb/><pb/> | |||
<p><!-- Pencil Heading -->Decimal Fractions.</p> | |||
<p>through them all being <lb/> | |||
down the first figure in <lb/> | |||
the repetend over again <lb/> | |||
and so proceed until your <lb/> | |||
quotient either repeats or <lb/> | |||
becomes as exact as is <lb/> | |||
necessary.—</p> | |||
<p>A series of 9<hi rend="superscript">s</hi> infinitely <lb/> | |||
continued is equal to unity <lb/> | |||
or one in the next left <lb/> | |||
hand place.—</p> | |||
<p>Any single repetend <lb/> | |||
divided by 10 and the <lb/> | |||
quotient subtracted from <lb/> | |||
the said repetend the <lb/> | |||
remainder will be the <lb/> | |||
same number complete <lb/> | |||
or teminate.—</p> | |||
<p>Hence it follows that <lb/> | |||
if a compound repetend <lb/> | |||
be divided by an unit <lb/> | |||
with so many cyphers <lb/> | |||
annexed as are equal to the <lb/> | |||
places of the repetend and <lb/> | |||
the quotient subtracted <lb/> | |||
from the said repetend the <lb/> | |||
remainder will be the same <lb/> | |||
number complete or terminate <lb/> | |||
that constituted the <lb/> | |||
repetend.—</p> | |||
<p><!-- Red ink -->To perform the work <lb/> | |||
of multiplication by <lb/> | |||
division or of division <lb/> | |||
by multiplication.—</p> | |||
<p>Divide an Unit with <lb/> | |||
cyphers annexed by the <lb/> | |||
given multiplier or divisor <lb/> | |||
the quotient will be <lb/> | |||
the divisor or multiplier <lb/> | |||
sought.—</p> | |||
<!-- DO NOT EDIT BELOW THIS LINE --> | <!-- DO NOT EDIT BELOW THIS LINE --> | ||
{{Metadata:{{PAGENAME}}}} | {{Metadata:{{PAGENAME}}}}{{Completed}} | ||
To add decimals wherein
are single reptends—
Make every line end at
the same place filling up
the vacancies by the repeating
digits and annexing
a cypher or cyphers
to the finite terms then
add as before only increase
the sum of the right hand
row with as many units
as it contains nines &
the figure in the Sum
under that place will be
a repetend—
To subtract finite decimals.
Having first set down the
greater the two numbers
given whether it be a whole
number mixed number or
decimal set down the less
under it according to the
directions given in addition
then subtract as in whole
numbers imagining all
the vacant places filled
with cyphers.—
To subtract decimals that
have repetends.—
Make the repetends similar
and conterminous &
subtract as in the last
case observing only if the
repetend of the number to
be subtracted be greater
than the repetend of the
number it is to be taken
from then the right hand
figure of the remainder
must be less by unity
than it would be if the
expressions were finite &
the repetend in the remainder
will consist of as many
places as there are in
the other two numbers.—
---page break---
When both factors are
finite decimals whether
they are single or joined
with integers,
Multiply them as
if they were all whole numbers
and from the product
towards the right hand cut
off so many places for
decimal parts in the
product as there were
in both the multiplier &
multiplicand counted together
but if it so happen
that there are not so many
places in the product
supply the defect by prefixing
cyphers.—
Two decimal fractions
being given to reserve in
their product any assigned
number of places.—
Sets the Units place
of the multiplier directly
under that figure of the
decimal part of the multiplicand
whose place
you would reserve in the
product and insert the
order of all its other places
that is the write the decimals
on the left hand
and the integers if any
on the right.—
Then in multiplying
always begin at that
figure of the multiplicand
which stands over the
figure wherewith you are
then multiplying setting
down the first figure of
each particular product
directly underneath one
another due regard being
had to the increase which
---page break---
which would arise out
of the two next figures
to the right hand of that
figure in the multiplicand
which you then begin with
carrying one from 5 to
15 two from 15 to 25 three
from 25 to 35 four from
35 to 45 &c and the Sum
of these lines will give
the product.—
In any of the following
cases in division if the
dividend be greater than
the divisor the quotient
will be either a whole or
a mixt number but
when the dividend is less
than the divisor the quotient
must necessarily be
a fraction for a less number
is contained in a greater
once at the least but
the greater is not contained
once in the less.—
When the divisor &
dividend are both finite
decimals
Divide as in whole
numbers and from the
right hand of the quotient
points off for decimals so
many places as the decimal
places in the dividend
exceed those in the
divisor and those to the
left if any are integers
but if the places of the
quotient are not so many
as this rule requires
supply the defect by prefixing
cyphers to the quotient
but if the decimal places
in the divisor be more
than those in the dividen annex
---page break---
annex cyphers to the dividend
to make them equal and
the quotient will be integers
until all those cyphers
are used.—
To contract the work of
division when the divisor
consists of many decimal
places.—
Having determined the
value of the quotient figures
let each remainder be a
now a dividend and for
every such dividend point
off one figure from the
right of the divisor observing
at each multiplication
to have regard to increase
of the figures so cut
off as in contracted
multiplication.—
If any whole mixed
or decimal number is
given to be divided by
10, 100, 1000 &c only remove
the separating point towards
the left hand so many
places as there are cyphers
in the divisor also in
multiplication the separating
point is moved to the
ri
ght hand so many
places are there cyphers
in the multiplier.—
If the dividend be a
repetend.—
If it be a single
repetend being down the
circulating figure until
the quotient either repeats
or is as exact as required
but if the repetend in the
dividend be a compound
one then being down the
circulating figures in the
same order they stand in
and when you have got thro'
---page break---
Decimal Fractions.
through them all being
down the first figure in
the repetend over again
and so proceed until your
quotient either repeats or
becomes as exact as is
necessary.—
A series of 9s infinitely
continued is equal to unity
or one in the next left
hand place.—
Any single repetend
divided by 10 and the
quotient subtracted from
the said repetend the
remainder will be the
same number complete
or teminate.—
Hence it follows that
if a compound repetend
be divided by an unit
with so many cyphers
annexed as are equal to the
places of the repetend and
the quotient subtracted
from the said repetend the
remainder will be the same
number complete or terminate
that constituted the
repetend.—
To perform the work
of multiplication by
division or of division
by multiplication.—
Divide an Unit with
cyphers annexed by the
given multiplier or divisor
the quotient will be
the divisor or multiplier
sought.—
|
Identifier: | JB/135/080/003"JB/" can not be assigned to a declared number type with value 135. |
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|---|---|---|---|
|
135 |
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|
080 |
decimal fractions |
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|
003 |
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|
private material |
2 |
||
|
recto |
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|
sir samuel bentham |
1798 |
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|
1798 |
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|
46198 |
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