The Quadrature of the Circle: The Square Root of Two, and the Right-angled Triangle |
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Page 11
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. anticipates the objection made by some ... angle in any way whatever , would give the quadrature if its extreme limit on the radius could be found . Perhaps ...
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. anticipates the objection made by some ... angle in any way whatever , would give the quadrature if its extreme limit on the radius could be found . Perhaps ...
Page 13
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. quadrature of the circle made by a poor peasant , according to which the circle having 8 for diameter is equal to the square having 10 for diagonal , that is ...
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. quadrature of the circle made by a poor peasant , according to which the circle having 8 for diameter is equal to the square having 10 for diagonal , that is ...
Page 14
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. 3 des . So Peter Metius , who undertook to refute him , was obliged to seek for a closer relation of the diameters to the circumference , and found that the ...
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. 3 des . So Peter Metius , who undertook to refute him , was obliged to seek for a closer relation of the diameters to the circumference , and found that the ...
Page 18
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. The third fool was named Dethlef Cluver , grandson or nephew of the celebrated geographer of that name . By ransacking the science of the infinite , on which ...
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. The third fool was named Dethlef Cluver , grandson or nephew of the celebrated geographer of that name . By ransacking the science of the infinite , on which ...
Page 31
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. XI , for 1739 , by which it would require only 80 hours of work to find 128 figures of Lagny ; there are also some in Stirling , Summatione Se- rierum , in ...
The Square Root of Two, and the Right-angled Triangle William Alexander Myers. XI , for 1739 , by which it would require only 80 hours of work to find 128 figures of Lagny ; there are also some in Stirling , Summatione Se- rierum , in ...
Other editions - View all
The Quadrature of the Circle: The Square Root of Two, and the Right-Angled ... William Alexander. Myers No preview available - 2015 |
The Quadrature of the Circle: The Square Root of Two, and the Right-Angled ... William Alexander Myers No preview available - 2018 |
Common terms and phrases
apothem arc cutting Archimedes ARTICLE assumed circumference assumed diameter Bisect chord circumscribed double triangle circumscribed polygon consequently cosine cumference curve decimal places deducted demonstration diagonal difference discovery division and cancellation double the number draw expressed extracting the square figures geometrical geometricians give given arc given circle given polygon given radius given square given triangle half the number hyperbola hypothenuse hypothesis infinite inscribed and circumscribed inscribed double triangle inscribed polygon inscribed square James Gregory less limit mathematical mean proportional method multiplied number of sides parabola perimeter perpendicular Plate polygon of double problem PROPOSITION quadrature quantity radius rectangle contained regular polygon result already established right angle right line right-angled triangle Scholium secant sine solution square described square root square the circle straight line Substituting the numbers subtracted tangent theorem trigonometry true circumference true ratio truth unity variable
Popular passages
Page 43 - It furnishes art with all her materials, and without it judgment itself can at best but " steal wisely : " for art is only like a prudent steward that lives on managing the riches of nature.' Whatever praises may be given to works of judgment, there is not even a single beauty in them to which the invention...
Page 64 - A plane rectilineal angle is the inclination of two straight lines to one another, which meet together, but are not in the same straight line.
Page 72 - AXIOMS. 1. Things which are equal to the same thing are equal to one another. 2. If equals be added to equals, the wholes are equal. 3. If equals be taken from equals, the remainders are equal.
Page 43 - Nor is it a wonder if he has ever been acknowledged the greatest of poets, who most excelled in that which is the very foundation of poetry. It is the invention that in different degrees...
Page 73 - If a straight line meets two straight lines, so as to " make the two interior angles on the same side of it taken " together less than two right angles...
Page 43 - And perhaps the reason why common critics are inclined to prefer a judicious and methodical genius to a great and fruitful one, is, because they find it easier for themselves to pursue their observations through an uniform and bounded walk of art, than to comprehend the vast and various extent of nature.
Page 42 - The star that bids the shepherd fold, Now the top of heaven doth hold ; And the gilded car of day His glowing axle doth allay In the steep Atlantic stream, And the slope sun his upward beam Shoots against the dusky pole, Pacing toward the other goal Of his chamber in the east.
Page 74 - In any right-angled triangle, the square which is described on the side subtending the right angle is equal to the sum of the squares described on the sides which contain the right angle.
Page 67 - The circumference of every circle is supposed to be divided into 360 equal parts, • called degrees, each degree into 60 minutes, and each minute into 60 seconds, etc.
Page 64 - A rhomboid, is that which has its opposite sides equal to one another, but all its sides are not equal, nor its angles right angles.