This is a table of type trigram and their frequencies. Use it to search & browse the list to learn more about your study carrel.
trigram | frequency |
---|---|
the sine of | 1156 |
sine of the | 1067 |
the line of | 846 |
so is the | 650 |
to find the | 562 |
the tangent of | 535 |
of the latitude | 499 |
the complement of | 447 |
to the sine | 442 |
of the suns | 423 |
complement of the | 385 |
from the center | 374 |
tangent of the | 370 |
the cosine of | 339 |
cosine of the | 327 |
is to the | 321 |
of the sun | 311 |
the difference of | 275 |
shall be the | 264 |
distance from the | 255 |
side of the | 247 |
on the line | 247 |
of the angle | 237 |
end of the | 229 |
equal to the | 228 |
the suns declination | 227 |
the nearest distance | 225 |
versed sine of | 223 |
the suns altitude | 221 |
one of the | 220 |
to finde the | 218 |
to the tangent | 216 |
line of sines | 215 |
the versed sine | 215 |
from the meridian | 214 |
the center of | 207 |
the length of | 200 |
the same way | 200 |
part of the | 199 |
is the sine | 198 |
difference of the | 194 |
of the declination | 193 |
to the other | 191 |
center of the | 191 |
line of numbers | 188 |
a line of | 188 |
of the line | 184 |
length of the | 182 |
the end of | 181 |
as in the | 179 |
the other foot | 178 |
east or west | 175 |
of the quadrant | 174 |
from the point | 172 |
the time of | 172 |
secant of the | 168 |
sine of d | 167 |
the distance of | 167 |
the secant of | 166 |
the meridian line | 165 |
the distance between | 164 |
sum of the | 163 |
as the radius | 162 |
the point of | 162 |
out of the | 162 |
as the sine | 160 |
the sum of | 160 |
according to the | 160 |
in the line | 159 |
of the day | 159 |
draw the line | 158 |
of the hour | 158 |
of the meridian | 158 |
the hour from | 157 |
sines of the | 157 |
the latitude of | 157 |
in the morning | 154 |
the thread to | 153 |
is to be | 152 |
the thred to | 151 |
by the line | 150 |
of the altitude | 149 |
lay the thread | 146 |
the use of | 143 |
of the place | 142 |
of the said | 142 |
and of the | 141 |
inclination of meridians | 141 |
time of the | 140 |
then a quadrant | 139 |
and the other | 137 |
and in the | 137 |
of the plain | 137 |
when the sun | 134 |
distance of the | 134 |
the extent from | 130 |
in the limb | 129 |
thread to the | 129 |
of the sines | 128 |
same way from | 126 |
the sines of | 126 |
the inclination of | 125 |
of the other | 125 |
foot of the | 125 |
distance between the | 123 |
on the right | 121 |
to draw the | 120 |
lay the thred | 119 |
the angle sought | 118 |
on the left | 117 |
of the given | 117 |
the angle at | 115 |
the stiles height | 114 |
the versed sines | 113 |
of the world | 113 |
the scale of | 112 |
to the point | 112 |
the number of | 112 |
the meridian of | 111 |
as the cosine | 110 |
edge of the | 109 |
use of the | 109 |
one foot of | 108 |
meridian of the | 108 |
parallel to the | 107 |
of the compasses | 107 |
point of the | 107 |
the square of | 107 |
height of the | 107 |
found to be | 107 |
take the distance | 106 |
the side of | 106 |
of the dyal | 106 |
which is the | 106 |
on the plain | 105 |
if it be | 105 |
the declination of | 105 |
azimuth from the | 104 |
line of lines | 104 |
from the south | 104 |
the distance from | 103 |
the suns azimuth | 102 |
is equal to | 102 |
find the suns | 101 |
the hour of | 100 |
of the horizon | 100 |
thred to the | 99 |
of a circle | 99 |
the height of | 98 |
will be found | 98 |
of the stile | 98 |
and from the | 97 |
of the side | 97 |
elevation of the | 96 |
point in the | 95 |
the substilar line | 95 |
nearest distance from | 95 |
of half the | 94 |
of the two | 94 |
take the nearest | 94 |
in the center | 93 |
declination of the | 93 |
the given angle | 92 |
of the same | 92 |
shall reach to | 92 |
with the other | 92 |
take out the | 91 |
the elevation of | 90 |
you shall find | 90 |
square of the | 90 |
of the pole | 90 |
hour of the | 90 |
the shadow of | 89 |
be found to | 88 |
day of the | 88 |
the azimuth from | 88 |
to the cosine | 87 |
by help of | 86 |
shall reach the | 86 |
on the other | 86 |
in the same | 86 |
p m p | 85 |
altitude of the | 85 |
the other side | 85 |
to sine of | 85 |
m p m | 85 |
to the radius | 85 |
line of the | 84 |
but if the | 84 |
in the point | 84 |
of the azimuth | 84 |
the side sought | 84 |
the altitude of | 84 |
tangent of d | 83 |
to the versed | 82 |
the beginning of | 82 |
reach the same | 82 |
the radius of | 81 |
opposite to the | 81 |
the point b | 81 |
and on the | 81 |
the lines of | 81 |
nearest distance to | 80 |
at the end | 79 |
east and west | 78 |
the content in | 78 |
is in the | 78 |
it may be | 78 |
is the tangent | 78 |
of the versed | 78 |
laying the thread | 78 |
greater then a | 77 |
may be found | 76 |
of the first | 76 |
then take the | 75 |
and draw the | 75 |
of the circle | 75 |
make it a | 75 |
the sun is | 74 |
you have the | 74 |
latitude of the | 73 |
s s s | 73 |
from the north | 73 |
early english books | 72 |
in the limbe | 72 |
of the ark | 72 |
shadow of the | 72 |
superficies of the | 72 |
above the horizon | 71 |
draw a line | 71 |
less then a | 70 |
the cotangent of | 70 |
the angle of | 70 |
of the square | 70 |
past in the | 69 |
the quantity of | 69 |
cotangent of the | 69 |
versed sines of | 69 |
place of the | 69 |
from the sine | 68 |
the hour and | 68 |
to the difference | 68 |
it will be | 68 |
in the figure | 68 |
pole of the | 68 |
and the thread | 68 |
the day of | 68 |
the compasses from | 68 |
of the radius | 67 |
are to be | 67 |
beginning of the | 67 |
the superficies of | 67 |
a table of | 67 |
between the two | 67 |
scale of altitudes | 66 |
the given side | 66 |
the sun hath | 66 |
is the difference | 66 |
of the night | 66 |
is the radius | 66 |
one point in | 66 |
the hours of | 66 |
in the first | 65 |
the ark of | 65 |
hour and azimuth | 65 |
in the afternoon | 65 |
shall shew the | 65 |
to the distance | 65 |
of the former | 65 |
the plains perpendicular | 64 |
declination in the | 64 |
the right edge | 64 |
the point d | 64 |
on the degrees | 64 |
the points of | 64 |
the place of | 64 |
in the meridian | 64 |
the lower figure | 64 |
by the sector | 63 |
the sun or | 63 |
to the meridian | 63 |
radius of the | 63 |
line of chords | 62 |
set one foot | 62 |
and with the | 62 |
to the thread | 62 |
the radius to | 62 |
in the table | 62 |
sines and tangents | 61 |
of your compasses | 61 |
line of tangents | 61 |
of the hours | 61 |
it in the | 61 |
from a to | 60 |
the suns right | 60 |
the first term | 60 |
suns distance from | 60 |
line on the | 59 |
so is to | 59 |
and it shall | 59 |
to the secant | 58 |
the other to | 58 |
content of the | 58 |
hour from noon | 58 |
which may be | 58 |
on the loose | 58 |
the middle of | 58 |
of the complement | 57 |
to the same | 57 |
be less then | 57 |
greater then the | 57 |
to the horizon | 57 |
and take the | 57 |
that is to | 57 |
to the square | 57 |
for finding the | 57 |
the length in | 57 |
the diameter of | 57 |
of the sides | 57 |
on the limb | 57 |
to the line | 57 |
of the stiles | 56 |
english books online | 56 |
the axeltree rod | 56 |
of the plane | 56 |
the stars hour | 56 |
of the compasse | 56 |
the said thread | 56 |
difference between the | 56 |
the center to | 56 |
of the difference | 56 |
of one of | 56 |
the east or | 56 |
to the plain | 56 |
to the thred | 55 |
then you must | 55 |
found in the | 55 |
help of the | 55 |
the suns distance | 55 |
in like manner | 54 |
finde the suns | 54 |
at the same | 54 |
table of the | 54 |
is the same | 54 |
of the reclination | 54 |
difference of longitude | 54 |
of the three | 54 |
in the said | 54 |
in the former | 54 |
a right line | 53 |
of the scale | 53 |
in this case | 53 |
altitude in the | 53 |
and lay it | 53 |
a rule laid | 53 |
of the dial | 53 |
a straight line | 53 |
find the hour | 53 |
perpendicular to the | 53 |
the difference between | 52 |
the radius is | 52 |
in the equal | 52 |
of the sum | 52 |
the difference in | 52 |
the same manner | 52 |
and the same | 52 |
of the th | 51 |
laying the thred | 51 |
to the length | 51 |
the parallels of | 51 |
of the rule | 51 |
toward the end | 51 |
the half sum | 51 |
is the cosine | 50 |
pole is elevated | 50 |
reach to the | 50 |
at right angles | 50 |
the foot of | 50 |
set one point | 50 |
lines on the | 50 |
and a half | 50 |
the substile from | 50 |
way from the | 50 |
and the angle | 50 |
to the complement | 50 |
cosecant of the | 50 |
if the sun | 49 |
less then the | 49 |
of versed sines | 49 |
to be the | 49 |
given to find | 49 |
it is a | 49 |
the latitude and | 49 |
point of entrance | 49 |
the substiles distance | 49 |
of the horizontal | 49 |
and lay the | 49 |
points of the | 49 |
wall or cieling | 49 |
from c to | 49 |
the left edge | 49 |
the th of | 48 |
to the co | 48 |
shall reach from | 48 |
the declination in | 48 |
the thread laid | 48 |
the straight line | 48 |
of the substile | 48 |
so that the | 48 |
the first tearm | 48 |
it to be | 48 |
be greater then | 48 |
and at the | 48 |
poles of the | 48 |
find the content | 48 |
rectangle of the | 47 |
is to say | 47 |
to a th | 47 |
of the axeltree | 47 |
extent from to | 47 |
the rectangle of | 47 |
of a foot | 47 |
the meridian altitude | 47 |
compasses in the | 47 |
will be the | 47 |
but if it | 47 |
the hour lines | 47 |
one point of | 47 |
and then the | 47 |
the horizontal line | 47 |
as the tangent | 47 |
found by the | 46 |
angle opposite to | 46 |
to the suns | 46 |
the thread over | 46 |
the arch of | 46 |
the poles of | 46 |
of the greater | 46 |
the pole of | 46 |
if you have | 46 |
counted on the | 46 |
rule laid from | 46 |
sine of half | 46 |
to a fourth | 46 |
the third term | 46 |
of the third | 46 |
the north pole | 46 |
as to the | 45 |
just touch the | 45 |
rule of three | 45 |
to draw a | 45 |
be in the | 45 |
to find a | 45 |
in the versed | 45 |
the other point | 45 |
and you shall | 45 |
be equal to | 45 |
in the scale | 45 |
radius to the | 45 |
the content of | 45 |
it on the | 44 |
the dial a | 44 |
the elevated pole | 44 |
from thence to | 44 |
taken out of | 44 |
of equal parts | 44 |
the intersection of | 44 |
for the latitude | 44 |
the center a | 44 |
the angle opposite | 44 |
between your compasses | 44 |
from the plains | 44 |
middle of the | 44 |
the same radius | 44 |
distance to it | 43 |
your compasses in | 43 |
it from the | 43 |
to the nearest | 43 |
from the pole | 43 |
but if you | 43 |
north and south | 43 |
for the hour | 43 |
upon the line | 43 |
as you see | 43 |
the other end | 43 |
from b to | 43 |
one foot in | 43 |
from d to | 43 |
to make a | 43 |
to the declination | 42 |
through the center | 42 |
of the hipotenusal | 42 |
of the moneth | 42 |
the particular scale | 42 |
the figure above | 42 |
to be d | 42 |
s a a | 42 |
the first of | 42 |
and make it | 42 |
line from the | 42 |
the wall or | 42 |
axis of the | 42 |
from the east | 42 |
to find how | 42 |
the manner of | 42 |
line of hours | 42 |
on the meridian | 42 |
to the center | 41 |
is called the | 41 |
of the style | 41 |
as it is | 41 |
of the plains | 41 |
sun or stars | 41 |
and to the | 41 |
the opposite side | 41 |
setting one point | 41 |
the second term | 41 |
distance to the | 41 |
in the lower | 41 |
to the first | 41 |
to the latitude | 41 |
suns altitude at | 41 |
laid to the | 41 |
to a semicircle | 41 |
the suns place | 41 |
by the trianguler | 41 |
the said ark | 40 |
the sun being | 40 |
arch of a | 40 |
of a line | 40 |
to the second | 40 |
the point i | 40 |
the true hour | 40 |
the distance run | 40 |
extent of the | 40 |
degrees on the | 40 |
in the second | 40 |
of the second | 40 |
right sine of | 40 |
and setting one | 40 |
then lay the | 40 |
north or south | 40 |
by the former | 40 |
then take out | 40 |
in the middle | 40 |
the line ab | 40 |
of the lesser | 40 |
of the half | 39 |
the third side | 39 |
of the equinoctial | 39 |
taken from the | 39 |
shall find the | 39 |
in feet and | 39 |
the making of | 39 |
it shews the | 39 |
to the angle | 39 |
uses of the | 39 |
represented by the | 39 |
the point o | 39 |
thred to nd | 39 |
laid over the | 39 |
the fixed piece | 38 |
the measure from | 38 |
the azimuth of | 38 |
and the complement | 38 |
the half of | 38 |
on the numbers | 38 |
the uses of | 38 |
to the content | 38 |
when it is | 38 |
the trianguler quadrant | 38 |
a a s | 38 |
latitude of london | 38 |
the houre lines | 38 |
leg to the | 38 |
extend the compasses | 38 |
distance on the | 38 |
side opposite to | 38 |
from the other | 38 |
substiles distance from | 38 |
description of the | 38 |
of an ark | 38 |
a tangent of | 37 |
or in the | 37 |
the table of | 37 |
the altitude sought | 37 |
of the pin | 37 |
draw the hour | 37 |
is the angle | 37 |
the extent of | 37 |
of north declination | 37 |
on the same | 37 |
lay it from | 37 |
feet and inches | 37 |
line of versed | 37 |
and so is | 37 |
the tropick of | 37 |
the higher figure | 37 |
text creation partnership | 37 |
in the sines | 37 |
difference of latitude | 37 |
given in inches | 37 |
into the center | 37 |
the rule of | 37 |
suns right ascention | 37 |
of the object | 37 |
to the side | 37 |
you shall have | 36 |
and it will | 36 |
of the month | 36 |
come to the | 36 |
the same with | 36 |
one and the | 36 |
the suns greatest | 36 |
so the tangent | 36 |
and the sum | 36 |
of the course | 36 |
the other way | 36 |
the plains declination | 36 |
the equal limb | 36 |
added to the | 36 |
finde the hour | 36 |
the true time | 36 |
to find an | 36 |
the new latitude | 36 |
then from the | 36 |
the coast of | 36 |
azimuth of the | 36 |
the tangents of | 36 |
you would have | 36 |
on the head | 35 |
line of latitudes | 35 |
and the point | 35 |
s s a | 35 |
the suns meridian | 35 |
that if the | 35 |
let it be | 35 |
or any other | 35 |
a line drawn | 35 |
a right angle | 35 |
the houre of | 35 |
of natural sines | 35 |
the eleuation of | 35 |
from the beginning | 35 |
ark of difference | 35 |
the stiles elevation | 35 |
to be found | 35 |
the suns amplitude | 35 |
from the substile | 35 |
hour from the | 35 |
counted from the | 35 |
so sine of | 35 |
of the year | 35 |
eleuation of the | 35 |
of the shadow | 35 |
the axis of | 35 |
and if the | 35 |
of the lines | 35 |
the help of | 34 |
scale of entrance | 34 |
from the right | 34 |
half sum of | 34 |
set to the | 34 |
two equal parts | 34 |
content in feet | 34 |
a s s | 34 |
from on the | 34 |
in the superficies | 34 |
in any latitude | 34 |
ark or angle | 34 |
sought as the | 34 |
length in feet | 34 |
in a foot | 34 |
the same extent | 34 |
sines on the | 34 |
the two first | 34 |
to nearest distance | 34 |
the logarithm of | 34 |
from the zenith | 34 |
thence to the | 34 |
and difference of | 34 |
prick off the | 34 |
finding the hour | 34 |
into two equal | 34 |
intersection of the | 34 |
in the equinoctial | 34 |
of the figure | 34 |
it to the | 34 |
according to nearest | 34 |
upon the center | 34 |
of the sine | 34 |
the point g | 34 |
and the hour | 33 |
measure from the | 33 |
on the quadrant | 33 |
and if you | 33 |
is the line | 33 |
lay a ruler | 33 |
then the complement | 33 |
quantity of the | 33 |
the figure below | 33 |
tangent of half | 33 |
lines of the | 33 |
the description of | 33 |
the thread and | 33 |
and the meridian | 33 |
of the limb | 33 |
the turning sight | 33 |
sines from the | 33 |
of the base | 33 |
of all the | 33 |
shall give the | 33 |
be found by | 33 |
find the time | 33 |
in this example | 33 |
based on the | 33 |
a ruler laid | 33 |
is the distance | 33 |
in the latitude | 33 |
and the suns | 33 |
that it may | 33 |
after the same | 33 |
points of shadow | 33 |
radius is to | 33 |
in this manner | 33 |
all sorts of | 33 |
in the triangle | 33 |
the top of | 33 |
is greater then | 33 |
line of natural | 32 |
diameter of the | 32 |
but when the | 32 |
the parallel of | 32 |
which you must | 32 |
extent from the | 32 |
is the complement | 32 |
altitude or depression | 32 |
so the sine | 32 |
at the beginning | 32 |
angle of the | 32 |
of the compass | 32 |
from f to | 32 |
the right sine | 32 |
suns azimuth from | 32 |
of the diameter | 32 |
from the end | 32 |
as a center | 32 |
the fourth term | 32 |
half the difference | 32 |
toward the head | 32 |
the side opposite | 32 |
from the line | 32 |
of sines from | 32 |
half the angle | 32 |
the latitude to | 32 |
of the proportion | 32 |
circle of the | 32 |
to be drawn | 32 |
of the equator | 32 |
of the poles | 32 |
the moons age | 32 |
sun is in | 32 |
one of them | 32 |
find how much | 32 |
then draw the | 32 |
of the tangent | 32 |
from the vertical | 32 |
in the other | 32 |
in the sine | 32 |
but just touch | 32 |
the price of | 32 |
degree of the | 31 |
of the trianguler | 31 |
to the fourth | 31 |
when you have | 31 |
to the number | 31 |
that shall be | 31 |
side sought as | 31 |
and the contrary | 31 |
the scale and | 31 |
the altitude in | 31 |
sum or difference | 31 |
sides of the | 31 |
the declination is | 31 |
be the sine | 31 |
to the diameter | 31 |
and that shall | 31 |
the two points | 31 |
and set the | 31 |
the measure of | 31 |
the remainder is | 31 |
foot on the | 31 |
of the houre | 31 |
top of the | 31 |
of the compassis | 31 |
thread over the | 31 |
of the fourth | 31 |
the contrary way | 30 |
as for example | 30 |
is all one | 30 |
coast of declination | 30 |
from the substilar | 30 |
and the like | 30 |
to the figure | 30 |
to the parallel | 30 |
the other angle | 30 |
azimuth in the | 30 |
sight to the | 30 |
the measured distance | 30 |
parallel of declination | 30 |
the common radius | 30 |
the half circle | 30 |
by the same | 30 |
in the third | 30 |
parallels of the | 30 |
is a line | 30 |
if you would | 30 |
with the meridian | 30 |
as much as | 30 |
beyond the center | 30 |
houre of the | 30 |
that if you | 30 |
and the distance | 30 |
with your compasses | 30 |
in the evening | 30 |
is less then | 30 |
and with this | 30 |
that the sun | 30 |
the same line | 30 |
upon the point | 30 |
the same time | 30 |
is the co | 30 |
either of the | 30 |
the way of | 30 |
to the altitude | 30 |
and the line | 30 |
is the length | 30 |
the south pole | 30 |
the whole line | 30 |
for the suns | 30 |
to be degrees | 29 |
the natural sine | 29 |
of the sunne | 29 |
and the opposite | 29 |
to the third | 29 |
is no other | 29 |
on each side | 29 |
foot in the | 29 |
or by the | 29 |
on the horizontal | 29 |
the point a | 29 |
the other leg | 29 |
the chord of | 29 |
in the lesser | 29 |
and the remainder | 29 |
degrees and minutes | 29 |
having the latitude | 29 |
of the thred | 29 |
the superficial content | 29 |
the th ark | 29 |
rising and setting | 29 |
distant from the | 29 |
of the tower | 29 |
the middle rule | 29 |
the solid content | 29 |
then if you | 29 |
extent at the | 29 |
on the said | 29 |
in the particular | 29 |
each of them | 29 |
sun hath d | 29 |
is the declination | 29 |
parallel sine of | 29 |
thread laid over | 29 |
find an angle | 29 |
the length and | 29 |
on the first | 29 |
to the end | 29 |
on the rule | 29 |
to the right | 29 |
be found in | 29 |
which will be | 29 |
the point f | 29 |
you see the | 29 |
the semidiameter of | 29 |
and the said | 29 |
you will find | 29 |
of the distance | 29 |
to the height | 29 |
from toward the | 29 |
on the moveable | 29 |
the axeltree of | 29 |
greater than the | 28 |
the altitude at | 28 |
make use of | 28 |
if you take | 28 |
degrees and minuts | 28 |
scale and the | 28 |
center to the | 28 |
the point e | 28 |
suns meridian altitude | 28 |
if it were | 28 |
the pole above | 28 |
pole above the | 28 |
foot of your | 28 |
place one foot | 28 |
of any ark | 28 |
the cosecant of | 28 |
any number of | 28 |
to one of | 28 |
the sides of | 28 |
so is sine | 28 |
logarithm of the | 28 |
the altitude is | 28 |
to secant of | 28 |
latitude and declination | 28 |
to on the | 28 |
be the true | 28 |
from the same | 28 |
suns greatest declination | 28 |
particular scale of | 28 |
of difference between | 28 |
of these two | 28 |
angle at b | 28 |
of the points | 28 |
one of those | 28 |
for if you | 28 |
the degrees of | 28 |
then by the | 28 |
foot of timber | 28 |
the general scale | 28 |
in the upper | 28 |
the bead to | 27 |
the suns rising | 27 |
no other then | 27 |
the loose piece | 27 |
the same as | 27 |
that is the | 27 |
suns present altitude | 27 |
true time of | 27 |
sine of an | 27 |
semidiameter of the | 27 |
it be a | 27 |
as the line | 27 |
azimuth from south | 27 |
the point m | 27 |
the suns true | 27 |
to the coast | 27 |
of the glasse | 27 |
other to the | 27 |
of the middle | 27 |
may be drawn | 27 |
to be added | 27 |
under the horizon | 27 |
the stile from | 27 |
and the thred | 27 |
find it to | 27 |
of the whole | 27 |
angles with the | 27 |
point of shadow | 27 |
the sum or | 27 |
the degrees on | 27 |
the compasses in | 27 |
the three sides | 27 |
between the scale | 27 |
in the th | 27 |
to the said | 27 |
as may be | 27 |
you shall finde | 27 |
side of a | 27 |
the first figure | 27 |
on the th | 27 |
line of equal | 27 |
the figure of | 27 |
in the use | 27 |
the edge of | 27 |
which is all | 27 |
and note the | 27 |
degrees from the | 27 |
every one of | 27 |
will find the | 27 |
axeltree of the | 27 |
d in the | 27 |
that you may | 27 |
rising or setting | 27 |
then right against | 27 |
the right hand | 27 |
scale of hours | 27 |
the point c | 27 |
feet and parts | 27 |
of the loose | 26 |
lines of sines | 26 |
it a parallel | 26 |
to the greater | 26 |
a s a | 26 |
found on the | 26 |
issuing from the | 26 |
and the given | 26 |
the latitude is | 26 |
stile from the | 26 |
drawn from the | 26 |
and the difference | 26 |
declination on the | 26 |
keying and markup | 26 |
the place where | 26 |
early works to | 26 |
the parallel sine | 26 |
it a in | 26 |
of the segment | 26 |
from the head | 26 |
will shew the | 26 |
the third tearm | 26 |
sine of deg | 26 |
there will be | 26 |
for the sun | 26 |
counted in the | 26 |
of a quadrant | 26 |
of the new | 26 |
help of a | 26 |
of an arch | 26 |
the distance on | 26 |
of the point | 26 |
of the higher | 26 |
at the pole | 26 |
the suns present | 26 |
from east or | 26 |
the angle between | 26 |
to find his | 26 |
to the former | 26 |
by the scheam | 26 |
of the instrument | 26 |
difference in longitude | 26 |
to the cotangent | 26 |
with this space | 26 |
in the horizontal | 26 |
it shall be | 26 |
and laying the | 26 |
then on the | 26 |
for the substile | 26 |
at the sine | 26 |
of the inclination | 26 |
the sum is | 26 |
is the time | 26 |
the breadth in | 26 |
the former extent | 26 |
on the equinoctial | 25 |
bead to the | 25 |
of the arch | 25 |
you must place | 25 |
a foot of | 25 |
the quadrant of | 25 |
ruler laid from | 25 |
of the stars | 25 |
being in the | 25 |
find the angle | 25 |
it cuts the | 25 |
from the first | 25 |
diameter of a | 25 |
natural sine of | 25 |
at the point | 25 |
meet with the | 25 |
sine in the | 25 |
latitude to the | 25 |
way from to | 25 |
and by the | 25 |
declination from the | 25 |
a in the | 25 |
with the horizon | 25 |
of the sector | 25 |
a parallel in | 25 |
the circle of | 25 |
then set the | 25 |
or the like | 25 |
measured on the | 25 |
of the feet | 25 |
and measure it | 25 |
compasses from the | 25 |
degrees of the | 25 |
into equal parts | 25 |
content of a | 25 |
the lesser sines | 25 |
find out the | 25 |
at any time | 25 |
make a foot | 25 |
more then the | 25 |
you may find | 25 |
then is the | 25 |
and the horizon | 25 |
open the other | 25 |
on that side | 25 |
in the reflected | 25 |
if the given | 25 |
the sun be | 24 |
to the breadth | 24 |
by the lines | 24 |
and the center | 24 |
and the altitude | 24 |
the said line | 24 |
angle at c | 24 |
there keep it | 24 |
so shall the | 24 |
it intersects the | 24 |
as you can | 24 |
the points b | 24 |
measure of the | 24 |
to get the | 24 |
to be sold | 24 |
of the elevation | 24 |
it must be | 24 |
plain of the | 24 |
the altitude required | 24 |
the plain of | 24 |
to make it | 24 |
of the leggs | 24 |
of a plain | 24 |
other foot of | 24 |
drawn on the | 24 |
which shall be | 24 |
it is to | 24 |
a piece of | 24 |
set off the | 24 |
the right ascention | 24 |
in a right | 24 |
to be divided | 24 |
be the tangent | 24 |
from the perpendiculer | 24 |
to the hour | 24 |
on the north | 24 |
from to the | 24 |
be divided into | 24 |
and enter the | 24 |
the right ascension | 24 |
parallels of declination | 24 |
ought to be | 24 |
the hour line | 24 |
as the co | 24 |
sum and difference | 23 |
will be d | 23 |
the sun to | 23 |
the declination from | 23 |
of the thread | 23 |
the center c | 23 |
find the azimuth | 23 |
sine of degrees | 23 |
it shall shew | 23 |
a point in | 23 |
d from the | 23 |
of the triangle | 23 |
the breadth of | 23 |
any of the | 23 |
by the artificial | 23 |
line of contingence | 23 |
instead of the | 23 |
of the sphear | 23 |
that you have | 23 |
by the point | 23 |
but by the | 23 |
in the degrees | 23 |
remainder is the | 23 |
the said extent | 23 |
may be done | 23 |
the azimuth is | 23 |
the description and | 23 |
of the fixed | 23 |
the same point | 23 |
the hipotenusal be | 23 |
to and fro | 23 |
the center at | 23 |
till the other | 23 |
and for the | 23 |
by the th | 23 |
the equal limbe | 23 |
to tangent of | 23 |
setting one foot | 23 |
in the hour | 23 |
of the length | 23 |
north pole is | 23 |
contrary to the | 23 |
the east and | 23 |
of the work | 23 |
difference in latitude | 23 |
of the quadrat | 23 |
parts of the | 23 |
degree of longitude | 23 |
turn the other | 23 |
by this means | 23 |
find the side | 23 |
the dial ground | 23 |
then if the | 23 |
fastened in the | 23 |
out the sine | 23 |
a foot long | 23 |
angle with the | 22 |
go to the | 22 |
would be found | 22 |
you may see | 22 |
from the elevated | 22 |
that part of | 22 |
the lines on | 22 |
so much as | 22 |
of the equinoctiall | 22 |
as you did | 22 |
the angle found | 22 |
so when the | 22 |
represented either as | 22 |
all the rest | 22 |
to touch the | 22 |
the sun in | 22 |
the complements of | 22 |
a quarter of | 22 |
either as utf | 22 |
the center o | 22 |
as before is | 22 |
rectified to the | 22 |
part of a | 22 |
of the lower | 22 |
with the line | 22 |
marked as illegible | 22 |
and the sun | 22 |
of the angles | 22 |
and the length | 22 |
is parallel to | 22 |
to the lesser | 22 |
ark of the | 22 |
the feet of | 22 |
for the azimuth | 22 |
tangents on the | 22 |
will not be | 22 |
parts of a | 22 |
it gives the | 22 |
on the sines | 22 |
is greater than | 22 |
angle at the | 22 |
which you may | 22 |
as the rectangle | 22 |
the two including | 22 |
the proportion will | 22 |
of the center | 22 |
you have a | 22 |
with the angle | 22 |
less than the | 22 |
and you have | 22 |
on the sector | 22 |
the reclination of | 22 |
set one of | 22 |
the terms of | 22 |
if you will | 22 |
right edge of | 22 |
will intersect the | 22 |
d of the | 22 |
passing through the | 22 |
the horizon sight | 22 |
is the center | 22 |
breadth of the | 22 |
compasses from to | 22 |
characters represented either | 22 |
the small quadrant | 22 |
on the wall | 22 |
the reflected horizon | 22 |
a great circle | 22 |
half of the | 22 |
as far as | 22 |
and where the | 22 |
tropick of cancer | 21 |
the space from | 21 |
the thread in | 21 |
north part of | 21 |
and set it | 21 |
third part of | 21 |
complement to d | 21 |
on the fixed | 21 |
thred and plummet | 21 |
the sector stands | 21 |
on the second | 21 |
to work this | 21 |
to do it | 21 |
much as the | 21 |
is in a | 21 |
to its opposite | 21 |
on the center | 21 |
on both sides | 21 |
the suns height | 21 |
nature of the | 21 |
the point v | 21 |
complements of the | 21 |
back to the | 21 |
in the air | 21 |
the proportion is | 21 |
its opposite side | 21 |
the sum and | 21 |
number of degrees | 21 |
the horizontal dial | 21 |
the work is | 21 |
angle at a | 21 |
must place one | 21 |
extent between the | 21 |
the sector at | 21 |
two including sides | 21 |
by a line | 21 |
proper to the | 21 |
perpendiculer to the | 21 |
draw the arch | 21 |
the product of | 21 |
then in the | 21 |
and then it | 21 |
a and b | 21 |
point to the | 21 |
and the converse | 21 |
sine of any | 21 |
where it intersects | 21 |
and enter it | 21 |
to be in | 21 |
in the two | 21 |
a line from | 21 |
thread and plummet | 21 |
and you will | 21 |
the upper semi | 21 |
may also be | 21 |
is the point | 21 |
and set one | 21 |
in the next | 21 |
it shall give | 21 |
the same in | 21 |
and the sine | 21 |
the upper face | 21 |
declination to the | 21 |
piece of timber | 21 |
tearm in the | 21 |
the vertical altitude | 21 |
fitted to the | 20 |
a line to | 20 |
the said reflected | 20 |
upon the quadrant | 20 |
to the common | 20 |
you may have | 20 |
to the true | 20 |
from the particular | 20 |
by the points | 20 |
to work proportions | 20 |
right angles with | 20 |
of one side | 20 |
cut by the | 20 |
thread in the | 20 |
as thus for | 20 |
draw the lines | 20 |
the nd from | 20 |
laid from q | 20 |
other side of | 20 |
dial in the | 20 |
a ruler to | 20 |
it shall reach | 20 |
suns right ascension | 20 |
the middle tearms | 20 |
may be made | 20 |
quadrant to the | 20 |
the thred on | 20 |
be added to | 20 |
one degree of | 20 |
angle between the | 20 |
for the hours | 20 |
one to another | 20 |
it is the | 20 |
and the declination | 20 |
feet of the | 20 |
having the same | 20 |
or depression at | 20 |
in the semicircle | 20 |
the line sol | 20 |
to the given | 20 |
drawn through the | 20 |
equall to the | 20 |
of sines on | 20 |
figure of the | 20 |
either in the | 20 |
at the hour | 20 |
the complement thereof | 20 |
touch the thred | 20 |
the north part | 20 |
found will be | 20 |
draw the circle | 20 |
the line a | 20 |
is the secant | 20 |
its complement to | 20 |
but for the | 20 |
on the diameter | 20 |
half an hour | 20 |
according to mr | 20 |
use of this | 20 |
th part of | 20 |
the moveable leg | 20 |
point of your | 20 |
from the greater | 20 |
the sun will | 20 |
keeping the sector | 20 |
the same distance | 20 |
the dial b | 20 |
set the bead | 20 |
find the square | 20 |
reach from the | 20 |
in respect of | 20 |
on the south | 20 |
from the points | 20 |
ends of the | 20 |
to find out | 20 |
the angle comprehended | 20 |
of the small | 20 |
and the two | 20 |
the same day | 20 |
points b and | 20 |
to the two | 20 |
after the french | 20 |
the converse of | 20 |
is found to | 20 |
than the first | 19 |
and so much | 19 |
as by the | 19 |
the rule to | 19 |
the fourth proportional | 19 |
arch of the | 19 |
one third part | 19 |
and so the | 19 |
the first leg | 19 |
prick down the | 19 |
a ruler from | 19 |
be sold at | 19 |
the line ac | 19 |
the rest of | 19 |
on all hours | 19 |
same with the | 19 |
the moveable piece | 19 |
where it cuts | 19 |
the hour in | 19 |
method of calculation | 19 |
number of feet | 19 |
to find what | 19 |
thread laid to | 19 |
you must add | 19 |
secant of d | 19 |
be taken out | 19 |
it shewes the | 19 |
if the hipotenusal | 19 |
and the product | 19 |
see in the | 19 |
a south plain | 19 |
the meridian or | 19 |
the angles at | 19 |
your line of | 19 |
must be set | 19 |
of in the | 19 |
you see in | 19 |
if you add | 19 |
the stile is | 19 |
the first to | 19 |
from the tangent | 19 |
placing of the | 19 |
the degrees it | 19 |
that end of | 19 |
then it is | 19 |
in the right | 19 |
of the star | 19 |
then the extent | 19 |
the three points | 19 |
the declination to | 19 |
and one of | 19 |
it were required | 19 |
the suns altitudes | 19 |
and from thence | 19 |
the former proportion | 19 |
and the second | 19 |
declination of a | 19 |
to the day | 19 |
by the sun | 19 |
six in the | 19 |
two sides with | 19 |
lay the dial | 19 |
above the plaine | 19 |
answer to the | 19 |
and where it | 19 |
the thred and | 19 |
height above the | 19 |
to make the | 19 |
be required to | 19 |
as the secant | 19 |
hours on the | 19 |
will be to | 19 |
draw with the | 19 |
substile from the | 19 |
the sun shall | 19 |
according as the | 19 |
out the tangent | 19 |
draw the dial | 19 |
of the dyall | 19 |
even with the | 19 |
together with the | 19 |
as well as | 19 |
shew the true | 19 |
the line bd | 19 |
from e to | 19 |
to be deg | 19 |
it and the | 18 |
as the first | 18 |
being turned twice | 18 |
as the cotangent | 18 |
sector at that | 18 |
level of the | 18 |
is the measure | 18 |
the poles elevation | 18 |
with the radius | 18 |
that may be | 18 |
parallel of the | 18 |
thread and the | 18 |
of the containing | 18 |
the pole to | 18 |
as it were | 18 |
be done by | 18 |
describe a circle | 18 |
thus for example | 18 |
lesse then the | 18 |
right ascension of | 18 |
of a great | 18 |
the first and | 18 |
suns altitude in | 18 |
that may meet | 18 |
scale of equal | 18 |
foot in length | 18 |
to the points | 18 |
it sheweth the | 18 |
other end of | 18 |
compasses on the | 18 |
towards the center | 18 |
about the point | 18 |
from v to | 18 |
hours of and | 18 |
of that star | 18 |
a polar plain | 18 |
and the azimuth | 18 |
true hour of | 18 |
measured from the | 18 |
hour from six | 18 |
hath d of | 18 |
off from the | 18 |
because it is | 18 |
line for the | 18 |
makes a foot | 18 |
the natural sines | 18 |
motion of the | 18 |
angle of position | 18 |
proportions in sines | 18 |
so the cosine | 18 |
make a mark | 18 |
it will hold | 18 |
suns declination is | 18 |
ascension of the | 18 |
the parts of | 18 |
pole to the | 18 |
the placing of | 18 |
find the distance | 18 |
of one foot | 18 |
opposite to one | 18 |
of the index | 18 |
the center downwards | 18 |
then a semicircle | 18 |
made equal to | 18 |
the same declination | 18 |
sum is the | 18 |
is the sum | 18 |
the distance in | 18 |
in such sort | 18 |
lines from the | 18 |
a pair of | 18 |
ark in the | 18 |
to the substile | 18 |
of the limbe | 18 |
and of his | 18 |
the limb at | 18 |
to the equinoctial | 18 |
measured in the | 18 |
to the stars | 18 |
to the winter | 18 |
and the tangent | 18 |
were required to | 18 |
of the axis | 18 |
the angle a | 18 |
if need be | 18 |
this is the | 18 |
reason of the | 18 |
it be required | 18 |
the altitude and | 18 |
fall on the | 18 |
the latitude required | 18 |
i call the | 18 |
the end thereof | 18 |
draw the ark | 18 |
then for the | 18 |
the azimuth in | 18 |
extend the other | 18 |
and the side | 18 |
on the upper | 17 |
length and breadth | 17 |
to be a | 17 |
on the edge | 17 |
to prick off | 17 |
as is to | 17 |
when the declination | 17 |
foot of that | 17 |
in the tangent | 17 |
of the gnomon | 17 |
take the suns | 17 |
the winter ecliptick | 17 |
and let the | 17 |
sorts of people | 17 |
twice the same | 17 |
applyed to the | 17 |
shall have the | 17 |
lay off the | 17 |
latitude in the | 17 |
then the latitude | 17 |
as for the | 17 |
and use of | 17 |
enter one foot | 17 |
they may be | 17 |
gives the point | 17 |
so that if | 17 |
of the cosine | 17 |
the th chapter | 17 |
to be measured | 17 |
tangent of an | 17 |
you must have | 17 |
and the nearest | 17 |
the greater sine | 17 |
of the signes | 17 |
the side a | 17 |
over the secant | 17 |
fourth part of | 17 |
the reclination inclination | 17 |
to divide a | 17 |
one end of | 17 |
as sine of | 17 |
of any two | 17 |
from the said | 17 |
product of the | 17 |
half the sum | 17 |
of a clock | 17 |
when the shadow | 17 |
on the under | 17 |
take the sine | 17 |
the french way | 17 |
through the points | 17 |
thred on the | 17 |
if you count | 17 |
to know the | 17 |
the given altitude | 17 |
it will intersect | 17 |
in regard the | 17 |
that extent at | 17 |
from the horizon | 17 |
on the azimuth | 17 |
the moons place | 17 |
will cut the | 17 |
is sine of | 17 |
you have found | 17 |
of an inch | 17 |
one of these | 17 |
the finding of | 17 |
on the index | 17 |
place where the | 17 |
for it must | 17 |
the containing sides | 17 |
d to the | 17 |
have the same | 17 |
the south part | 17 |
the space between | 17 |
tangent of a | 17 |
the under face | 17 |
right against the | 17 |
to half the | 17 |
in finding the | 17 |
a fourth sine | 17 |
finding the azimuth | 17 |
work proportions in | 17 |
how much is | 17 |
shew the hour | 17 |
of the week | 17 |
divided into two | 17 |
and there keep | 17 |
b of the | 17 |
or difference of | 17 |
by the rule | 17 |
first of march | 17 |
left edge of | 17 |
the north and | 17 |
parallel in the | 17 |
by reason of | 17 |
of the number | 17 |
the angle required | 17 |
the substile and | 17 |
find the altitude | 17 |
the horizontall line | 17 |
out the parallel | 17 |
the other two | 17 |
at that gage | 17 |
having found the | 17 |
of the room | 17 |
to the north | 17 |
the ascensional difference | 17 |
altitudes on all | 17 |
of the projection | 17 |
the circles of | 17 |
the tangent required | 17 |
declin d east | 17 |
the meridian is | 17 |
and upon the | 17 |
laying a ruler | 17 |
to the south | 17 |
the suns going | 17 |
the fourth ark | 17 |
the center on | 17 |
will but just | 17 |
you are to | 17 |
line of a | 17 |
is the number | 17 |
the distances of | 17 |
take with your | 17 |
the head of | 17 |
in all other | 17 |
the horizontal projection | 17 |
for this purpose | 17 |
findes the point | 17 |
which are the | 17 |
as the difference | 17 |
between the meridian | 17 |
for the distance | 17 |
the quadrant to | 17 |
if the sum | 17 |
as you may | 17 |
turned twice the | 17 |
drawn into the | 17 |
the point t | 17 |
in the south | 17 |
by the two | 17 |
right angled sphoerical | 17 |
before or after | 17 |
in the points | 16 |
center on the | 16 |
the reflected hour | 16 |
distance from thence | 16 |
of this line | 16 |
is represented by | 16 |
more than the | 16 |
these two points | 16 |
length of a | 16 |
elevation above the | 16 |
c and d | 16 |
point where the | 16 |
be to find | 16 |
edges of the | 16 |
before in the | 16 |
of the sunnes | 16 |
line in the | 16 |
to give the | 16 |
for any other | 16 |
the way to | 16 |
in the analemma | 16 |
you have drawn | 16 |
the pole is | 16 |
to cosine of | 16 |
which in this | 16 |
halfs and quarters | 16 |
sought in the | 16 |
the two sides | 16 |
the index and | 16 |
with the same | 16 |
and azimuth in | 16 |
if you lay | 16 |
must be placed | 16 |
rest of the | 16 |
find the latitude | 16 |
and take out | 16 |
the bulls eye | 16 |
on the backside | 16 |
for the same | 16 |
when the altitude | 16 |
s a s | 16 |
and open the | 16 |
derived from the | 16 |
to be graduated | 16 |
and the foot | 16 |
polar plains reclination | 16 |
at the head | 16 |
is the versed | 16 |
to finde a | 16 |
that in the | 16 |
the new declination | 16 |
in the co | 16 |
the pin ab | 16 |
the greatest declination | 16 |
of the right | 16 |
the stars right | 16 |
converse of the | 16 |
the zenith and | 16 |
product shall be | 16 |
the art of | 16 |
of the rumb | 16 |
of shadow c | 16 |
enter the former | 16 |
from p to | 16 |
and all the | 16 |
the names of | 16 |
divisions of the | 16 |
divided into parts | 16 |
of south declination | 16 |
from the foot | 16 |
or if the | 16 |
of the zodiack | 16 |
it is not | 16 |
to all sorts | 16 |
of the head | 16 |
from the middle | 16 |
will be less | 16 |
is the greater | 16 |
the midnight meridian | 16 |
laid from the | 16 |
cut the line | 16 |
superficial content of | 16 |
from in the | 16 |
in the summer | 16 |
hole in the | 16 |
the cube of | 16 |
above the plain | 16 |
hour in the | 16 |
an hour past | 16 |
shall stay at | 16 |
then the nearest | 16 |
the right way | 16 |
on the hour | 16 |
to any radius | 16 |
the square to | 16 |
the other sides | 16 |
and declination of | 16 |
in the forenoon | 16 |
proportion between the | 16 |
above the substile | 16 |
of right angled | 16 |
distance in the | 16 |
the product shall | 16 |
sine of a | 16 |
of the shaddow | 16 |
given angle be | 16 |
hour line of | 16 |
they shall be | 16 |
of that arch | 16 |
of the clock | 16 |
in the dyal | 16 |
the point r | 16 |
for the stiles | 16 |
the sine thereof | 16 |
south or north | 16 |
or which is | 16 |
clock in the | 16 |
the head leg | 16 |
the circle bcde | 16 |
to the wall | 16 |
tropick of capricorn | 16 |
the true content | 16 |
is found by | 16 |
be the radius | 16 |
toward the south | 16 |
the night by | 16 |
on the back | 16 |
upon the plain | 16 |
in the winter | 16 |
to cosecant of | 16 |
circle on the | 16 |
the proportion to | 16 |
suns going off | 16 |
touch the thread | 16 |
in a straight | 16 |
the point p | 16 |
that when the | 16 |
and the scale | 16 |
if the declination | 16 |
points in the | 16 |
the sunne is | 16 |
upon this point | 16 |
shall divide the | 16 |
and are to | 16 |
solid content of | 15 |
markup reviewed and | 15 |
reviewed and edited | 15 |
find the length | 15 |
to the terms | 15 |
i text is | 15 |
the like for | 15 |
financial support to | 15 |
in the quadrant | 15 |
the base of | 15 |
tcp assigned for | 15 |
angle at d | 15 |
tiff page images | 15 |
by the institutions | 15 |
the left hand | 15 |
at the declination | 15 |
of any other | 15 |
on the lines | 15 |
to the early | 15 |
this keyboarded and | 15 |
down from the | 15 |
to be wrought | 15 |
the early english | 15 |
all without asking | 15 |
in the great | 15 |
and xml conversion | 15 |
that th to | 15 |
of creative commons | 15 |
of the south | 15 |
of this extent | 15 |
be wrought by | 15 |
is the third | 15 |
providing financial support | 15 |
the second and | 15 |
it at the | 15 |
is divided into | 15 |
thus you see | 15 |
leg of the | 15 |
the other middle | 15 |
of the use | 15 |
to the horizontal | 15 |
by the second | 15 |
the outward ledge | 15 |
shewed in the | 15 |
parallels of altitude | 15 |
finde the azimuth | 15 |
doth to the | 15 |
the next equinoctial | 15 |
come back to | 15 |
encoded edition of | 15 |
terms of creative | 15 |
circles of position | 15 |
a direct south | 15 |
quarter of a | 15 |
owned by the | 15 |
which is called | 15 |
then the former | 15 |
compasse to the | 15 |
the plaines declination | 15 |
is available for | 15 |
any one of | 15 |
from the next | 15 |
keyed and coded | 15 |
proportion will be | 15 |
before is shewed | 15 |
side greater then | 15 |
support to the | 15 |
in the following | 15 |
and find the | 15 |
the point n | 15 |
of a star | 15 |
keyboarded and encoded | 15 |
lines for the | 15 |
tangent of degrees | 15 |
in the vertical | 15 |
angle of and | 15 |
end of a | 15 |
sine of that | 15 |
work described above | 15 |
the text can | 15 |
toward the north | 15 |
elevated above the | 15 |
of the greatest | 15 |
from proquest page | 15 |
and encoded edition | 15 |
encoded text transcribed | 15 |
this phase i | 15 |
sampled and proofread | 15 |
of that extent | 15 |
in the year | 15 |
a clock line | 15 |
foot of this | 15 |
the ends of | 15 |
of any star | 15 |
and coded from | 15 |
adjacent to the | 15 |
text transcribed from | 15 |
which in the | 15 |
pfs batch review | 15 |
from q to | 15 |
institutions providing financial | 15 |
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from the former | 15 |
of a fourth | 15 |
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of that arks | 15 |
till the shadow | 15 |
the answer to | 15 |
the affection of | 15 |
the truth of | 15 |
to the axeltree | 15 |
the thread being | 15 |
and prick them | 15 |
be d from | 15 |
hours and quarters | 15 |
as you please | 15 |
then the other | 15 |
on which the | 15 |
for the true | 15 |
is the suns | 15 |
the institutions providing | 15 |
distributed and performed | 15 |
tangents of the | 15 |
such proportion to | 15 |
the right angle | 15 |
cuts the limb | 15 |
and that is | 15 |
the latitude in | 15 |
shall represent the | 15 |
the two middle | 15 |
the residue is | 15 |
the declination be | 15 |
the former directions | 15 |
the whole content | 15 |
by changing the | 15 |
to work the | 15 |
above is co | 15 |
to that radius | 15 |
if you set | 15 |
to the straight | 15 |
then set one | 15 |
of the great | 15 |
much is in | 15 |
text is available | 15 |
close to the | 15 |
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images scanned from | 15 |
from the third | 15 |
iv tiff page | 15 |
first to the | 15 |
is the true | 15 |
will be a | 15 |
the hour is | 15 |
the other part | 15 |
set it from | 15 |
at the first | 15 |
from the scale | 15 |
place in the | 15 |
the point where | 15 |
edition of the | 15 |
angles at the | 15 |
kb of xml | 15 |
when the suns | 15 |
online text creation | 15 |
can be copied | 15 |
substracted from the | 15 |
text can be | 15 |
a sine of | 15 |
for commercial purposes | 15 |
when the two | 15 |
the cuspis of | 15 |
and through the | 15 |
a upon the | 15 |
or from the | 15 |
the center is | 15 |
of the secant | 15 |
without asking permission | 15 |
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toward the center | 15 |
for keying and | 15 |
first for the | 15 |
the two places | 15 |
the compasses on | 15 |
proquest page images | 15 |
sides are given | 15 |
text and markup | 15 |
coded from proquest | 15 |
i find the | 15 |
you see that | 15 |
for that day | 15 |
phase i text | 15 |
of the sphere | 15 |
take the latteral | 15 |
how much in | 15 |
books online text | 15 |
assigned for keying | 15 |
the meridian and | 15 |
point on the | 15 |
available for reuse | 15 |
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the answer required | 15 |
you take the | 15 |
the same scale | 15 |
required to find | 15 |
so tangent of | 15 |
make in the | 15 |
scanned from microfilm | 15 |
not to be | 15 |
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the meridian circle | 15 |
the center and | 14 |
of a polar | 14 |
these two arks | 14 |
which added to | 14 |
on the sine | 14 |
if the altitude | 14 |
of the eye | 14 |
the content required | 14 |
hours and minutes | 14 |
on the moving | 14 |
of the natural | 14 |
finding of the | 14 |
is half the | 14 |
latitude is to | 14 |
or pole of | 14 |
you must lay | 14 |
out on the | 14 |
each of those | 14 |
is the meridian | 14 |
of d to | 14 |
the answer in | 14 |
is more then | 14 |
after the manner | 14 |
ledge of the | 14 |
between the eye | 14 |
we may find | 14 |
be called the | 14 |
the two former | 14 |
by the last | 14 |
and turn the | 14 |
the horizon at | 14 |
the thred laid | 14 |
the right line | 14 |
south part of | 14 |
but in winter | 14 |
second and third | 14 |
to be placed | 14 |
every hour and | 14 |
night by the | 14 |
sun will be | 14 |
in stead of | 14 |
by it self | 14 |
a number of | 14 |
of a square | 14 |
in the suns | 14 |
in one point | 14 |
to the sum | 14 |
cotang of the | 14 |
minutes past in | 14 |
the noon meridian | 14 |
to represent the | 14 |
dial a upon | 14 |
those two points | 14 |
but in the | 14 |
azimuth will be | 14 |
the limb from | 14 |
and a line | 14 |
use of a | 14 |
in our latitude | 14 |
shall be a | 14 |
see that the | 14 |
proportion to the | 14 |
the point l | 14 |
shall find it | 14 |
example in the | 14 |
for the first | 14 |
inches on the | 14 |
draw the quadrant | 14 |
some uses of | 14 |
to project the | 14 |
if the line | 14 |
to the nd | 14 |
is the first | 14 |
first leg to | 14 |
to the place | 14 |
hour will be | 14 |
the altitude to | 14 |
term is to | 14 |
distance from to | 14 |
enter the radius | 14 |
a true meridian | 14 |
breadth in inches | 14 |
counting from the | 14 |
on the floor | 14 |
of shadow cdf | 14 |
all the other | 14 |
the first day | 14 |
cuspis of the | 14 |
of a number | 14 |
foot to the | 14 |
to cut the | 14 |
south pole is | 14 |
it is in | 14 |
the summe of | 14 |
the plain is | 14 |
one side of | 14 |
a clock in | 14 |
is given to | 14 |
to the pole | 14 |
this extent at | 14 |
so if the | 14 |
in an inch | 14 |
from z to | 14 |
to be used | 14 |
you come to | 14 |
in the east | 14 |
the suns ascension | 14 |
to the whole | 14 |
first day of | 14 |
sine of declination | 14 |
from the half | 14 |
which must be | 14 |
laid from p | 14 |
of an hour | 14 |
in this latitude | 14 |
will reach to | 14 |
i would know | 14 |
as the figure | 14 |
the th term | 14 |
you have in | 14 |
foot according to | 14 |
upon the same | 14 |
for the inclination | 14 |
the degrees from | 14 |
tangent of any | 14 |
of the plaine | 14 |
the difference is | 14 |
line of degrees | 14 |
from the hour | 14 |
find the point | 14 |
in which the | 14 |
the first operation | 14 |
and may be | 14 |
wrought by the | 14 |
for example in | 14 |
the sector so | 14 |
fixed in the | 14 |
line a b | 14 |
square to the | 14 |
extend the thred | 14 |
the degrees and | 14 |
be the same | 14 |
the equinoctial line | 14 |
line parallel to | 14 |
on the contrary | 14 |
in that line | 14 |
equal with the | 14 |
by taking the | 14 |
of the four | 14 |
then substract the | 14 |
the mean diameter | 14 |
on a quadrant | 14 |
that can be | 14 |
through which the | 14 |
description and use | 14 |
the circle into | 14 |
in the horizon | 14 |
without the help | 14 |
on the east | 14 |
the first part | 14 |
between the thread | 14 |
a th ark | 14 |
the declination and | 14 |
so in the | 14 |
must lay the | 14 |
set half the | 14 |
the drawing of | 14 |
to prick down | 14 |
sun being in | 14 |
of the ecliptick | 14 |
of the heavens | 14 |
may find the | 14 |
of the houres | 14 |
end of it | 14 |
the rate of | 14 |
the differences of | 14 |
the sun comes | 14 |
you are in | 14 |
the sun have | 14 |
then the proportion | 14 |
length in inches | 14 |
then will the | 14 |
other foot according | 14 |
if the suns | 14 |
by the quadrant | 13 |
time of sun | 13 |
of the polar | 13 |
if the two | 13 |
the interjacent side | 13 |
sides with the | 13 |
parallel unto the | 13 |
as the sector | 13 |
bd of the | 13 |
two or three | 13 |
having drawn the | 13 |
scale of sines | 13 |
by the center | 13 |
segment of a | 13 |
all manner of | 13 |
as the latteral | 13 |
reclining or inclining | 13 |
the second tearm | 13 |
third to the | 13 |
two lines of | 13 |
the diameter in | 13 |
so cosine of | 13 |
the sine to | 13 |
or tangent of | 13 |
two first tearms | 13 |
the moons hour | 13 |
a b c | 13 |
the horizon and | 13 |
of the east | 13 |
set the first | 13 |
the base or | 13 |
by the rules | 13 |
may be taken | 13 |
in the circumference | 13 |
hour and quarter | 13 |
as in this | 13 |
and it is | 13 |
the parralel of | 13 |
and draw lines | 13 |
of the aequinoctiall | 13 |
an east or | 13 |
affection of the | 13 |
of the horizontall | 13 |
in one and | 13 |
the first place | 13 |
the circle on | 13 |
that in all | 13 |
distance from a | 13 |
you shall see | 13 |
the vses of | 13 |
of the north | 13 |
of sun rising | 13 |
the upper quadrant | 13 |
the other the | 13 |
and also the | 13 |
how much the | 13 |
to a new | 13 |
the line qop | 13 |
and keeping the | 13 |
in the azimuth | 13 |
line may be | 13 |
the reflected meridian | 13 |
and foot long | 13 |
till you see | 13 |
open your compasses | 13 |
day of march | 13 |
altitude on the | 13 |
then laying the | 13 |
angled sphoerical triangles | 13 |
and lay off | 13 |
or line of | 13 |
by the length | 13 |
the demonstration of | 13 |
the th part | 13 |
the present altitude | 13 |
it would be | 13 |
are the same | 13 |
down the line | 13 |
in the place | 13 |
first draw the | 13 |
quadrant of latitudes | 13 |
on the foreside | 13 |
the angle the | 13 |
on the dial | 13 |
set on the | 13 |
time of rising | 13 |
give you the | 13 |
used in the | 13 |
the hour will | 13 |
between it and | 13 |
a direct north | 13 |
half difference of | 13 |
arks on the | 13 |
is the altitude | 13 |
at degrees high | 13 |
of the turning | 13 |
that arks complement | 13 |
lines in the | 13 |
to the beginning | 13 |
by laying the | 13 |
find the third | 13 |
on the opposite | 13 |
by applying the | 13 |
and the square | 13 |
all the uses | 13 |
your compasses unto | 13 |
would have the | 13 |
and to be | 13 |
applied the same | 13 |
on the day | 13 |
point of one | 13 |
to the latteral | 13 |
is alwayes the | 13 |
horizontal line of | 13 |
with this opening | 13 |
the compasse to | 13 |
get the sum | 13 |
as you shall | 13 |
divide it into | 13 |
now if you | 13 |
the logarithms of | 13 |
degrees of altitude | 13 |
line of six | 13 |
former extent between | 13 |
page to find | 13 |
the thred shall | 13 |
of the perpendiculer | 13 |
to set the | 13 |
the height required | 13 |
sine to the | 13 |
th to the | 13 |
common to both | 13 |
an angle of | 13 |
declination of any | 13 |
on the square | 13 |
for the angle | 13 |
divide the space | 13 |
the pin b | 13 |
reclination or inclination | 13 |
to in the | 13 |
cutting the line | 13 |
are equal to | 13 |
you may make | 13 |
an acute angle | 13 |
hours after the | 13 |
measure it on | 13 |
by the first | 13 |
the said arch | 13 |
be taken off | 13 |
back again to | 13 |
to the plains | 13 |
of natural tangents | 13 |
root of a | 13 |
to divide the | 13 |
reclination of the | 13 |
right angled triangles | 13 |
is from the | 13 |
and let it | 13 |
every degree of | 13 |
a parallel sine | 13 |
the annexed tangent | 13 |
sine of ad | 13 |
of the amplitude | 13 |
the tenth of | 13 |
parralel of altitude | 13 |
index and square | 13 |
other of the | 13 |
suns altitude on | 13 |
i would have | 13 |
all the hour | 13 |
given to finde | 13 |
which you have | 13 |
artificial sines and | 13 |
be less than | 13 |
the summer ecliptick | 13 |
winter meridian altitude | 13 |
if the other | 13 |
altitude on all | 13 |
with the space | 13 |
also in the | 13 |
i of the | 13 |
sine of one | 13 |
of halfe the | 13 |
the most part | 13 |
the index to | 13 |
then in regard | 13 |
making of a | 13 |
if one of | 13 |
the hipotenusal as | 13 |
the eye and | 13 |
of the complements | 13 |
so much is | 13 |
must needs be | 13 |
on one side | 13 |
is the nearest | 13 |
from the left | 13 |
the ark or | 13 |
get the difference | 13 |
upon the points | 13 |
for if the | 13 |
meet with it | 12 |
because the sun | 12 |
other part of | 12 |
equal to a | 12 |
the versed scale | 12 |
south and north | 12 |
of the moon | 12 |
the meridian between | 12 |
given the side | 12 |
go and mark | 12 |
side less then | 12 |
the nature of | 12 |
in the greater | 12 |