Easy Introduction to Mathematics, Volume 2Barlett & Newman, 1814 |
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... INFINITE SERIES , their Nature , & c . To reduce Fractions to Infinite Series 134 138 143 146 · · 147 • • 150 153 • • 155 159 162 · 163 165 173 . 176 . 181 182 184 . 185 . 190 191 • 192 195 To reduce compound quadratic Surds to ...
... INFINITE SERIES , their Nature , & c . To reduce Fractions to Infinite Series 134 138 143 146 · · 147 • • 150 153 • • 155 159 162 · 163 165 173 . 176 . 181 182 184 . 185 . 190 191 • 192 195 To reduce compound quadratic Surds to ...
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... INFINITE SERIES , their Nature , & c . To reduce Fractions to Infinite Series To reduce compound quadratic Surds to Infinite Series Newton's Binomial Theorem To find the Orders of Differences To find any Term of a Series To interpolate a ...
... INFINITE SERIES , their Nature , & c . To reduce Fractions to Infinite Series To reduce compound quadratic Surds to Infinite Series Newton's Binomial Theorem To find the Orders of Differences To find any Term of a Series To interpolate a ...
Page 179
... series is that in which the terms increase or decrease by an equal difference , as 1 , 3 , 5 , 7 , & c . 9 , 6 , 3 , 0 , & c . a + 2a + 3 a , & c . 6. A ... INFINITE SERIES, their Nature, To reduce Fractions to Infinite Series.
... series is that in which the terms increase or decrease by an equal difference , as 1 , 3 , 5 , 7 , & c . 9 , 6 , 3 , 0 , & c . a + 2a + 3 a , & c . 6. A ... INFINITE SERIES, their Nature, To reduce Fractions to Infinite Series.
Page 179
... series required . 1 + x -x - x2 x2 2. Reduce I - z ) a a Explanation . This operation is similar to those in Art . 50 . Part 3. Vol . I. It is unnecessary to proceed farther in the work , since we can readily ... INFINITE SERIES .
... series required . 1 + x -x - x2 x2 2. Reduce I - z ) a a Explanation . This operation is similar to those in Art . 50 . Part 3. Vol . I. It is unnecessary to proceed farther in the work , since we can readily ... INFINITE SERIES .
Page 179
... infinite series , which probably never was thought of before his time . The theorem was obtained at first by induction , and for some time no demonstration of it appears to have been attempted ; several mathematicians have however since ...
... infinite series , which probably never was thought of before his time . The theorem was obtained at first by induction , and for some time no demonstration of it appears to have been attempted ; several mathematicians have however since ...
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Common terms and phrases
Algebra arithmetical progression axis base bisected called centre chord circle circumference CN˛ co-sec co-sine co-tan completing the square Conic Sections cube curve diameter distance divided draw EC˛ equal Euclid Euclid's Elements EXAMPLES.-1 find the numbers former fourth fraction geometrical geometrical progression given equation given ratio greater harmonical mean Hence infinite series inversely last term latter latus rectum less likewise logarithms magnitude method multiplied number of terms odd number parallel parallelogram perpendicular PN˛ polygon problem Prop proposition Q. E. D. Cor quadrant quotient radius rectangle remainder right angles rule secant shew shewn sides sine solidity straight line substituted subtract tangent theor theorems third triangle unknown quantity VC˛ versed sine whence wherefore whole numbers x=the
Popular passages
Page 280 - If a straight line touch a circle, and from the point of contact a chord be drawn, the angles which this chord makes with the tangent are equal to the angles in the alternate segments.
Page 235 - If two triangles have two sides of the one equal to two sides of the...
Page 247 - TO a given straight line to apply a parallelogram, which shall be equal to a given triangle, and have one of its angles equal to a given rectilineal angle.
Page 62 - If four magnitudes are proportional, the sum of the first and second is to their difference as the sum of the third and fourth is to their difference.
Page 353 - In the same way it may be proved that a : b : : sin. A : sin. B, and these two proportions may be written a : 6 : c : : sin. A : sin. B : sin. C. THEOREM III. t8. In any plane triangle, the sum of any two sides is to their difference as the tangent of half the sum of the opposite angles is to the tangent of half their difference. By Theorem II. we have a : b : : sin. A : sin. B.
Page 232 - But things which are equal to the same are equal to one another...
Page 256 - If a straight line be bisected, and produced to any point ; the rectangle contained by the whole line thus produced, and the part of it produced, together with the square of half the line bisected, is equal to the square of the straight line which is made up of the half and the part produced.
Page 160 - Take the first term from the second, the second from the third, the third from the fourth, &c. and the remainders will form a new series, called the first order of
Page 269 - II. Two magnitudes are said to be reciprocally proportional to two others, when one of the first is to one of the other magnitudes as the remaining one of the last two is to the remaining one of the first.
Page 272 - If two triangles have one angle of the one equal to one angle of the other and the sides about these equal angles proportional, the triangles are similar.