A Course of Mathematics: In Three Volumes : Composed for the Use of the Royal Military Academy ...J. Johnson, 1811 |
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Page 33
... altitude will be a right line LM parallel to the base ; and when LM in the above figure becomes parallel to AB , since MCB = ACL , MCB CBA ( th . 12 Geom . ) , ACL = CAB ; it follows that CAB = CBA , and consequently AC = CB ( th . 4 ...
... altitude will be a right line LM parallel to the base ; and when LM in the above figure becomes parallel to AB , since MCB = ACL , MCB CBA ( th . 12 Geom . ) , ACL = CAB ; it follows that CAB = CBA , and consequently AC = CB ( th . 4 ...
Page 34
... altitude ) greater than the surface ( or than the altitude ) of the triangle ABD . Draw c'd through D , parallel to AB , to cut CE ( drawn perpendicular to AB ) in c ' : then it is to be demonstrated that CE is greater than c'E . The ...
... altitude ) greater than the surface ( or than the altitude ) of the triangle ABD . Draw c'd through D , parallel to AB , to cut CE ( drawn perpendicular to AB ) in c ' : then it is to be demonstrated that CE is greater than c'E . The ...
Page 42
... all Prisms of the Same Altitude , whose Base is Given in Magnitude and Species , or Figure , or Shape , the Right Prism has the Smallest Surface . For , For , the area of each face of the prism 42 ELEMENTS OF ISOPERIMETRY .
... all Prisms of the Same Altitude , whose Base is Given in Magnitude and Species , or Figure , or Shape , the Right Prism has the Smallest Surface . For , For , the area of each face of the prism 42 ELEMENTS OF ISOPERIMETRY .
Page 43
... Altitude , or the Greatest Capacity . This is the converse of the preceding theorem , and may readily be proved after the manner of theorem 2 . THEOREM XIX . Of all Right Prisms of the Same Altitude , whose Bases are Given in Magnitude ...
... Altitude , or the Greatest Capacity . This is the converse of the preceding theorem , and may readily be proved after the manner of theorem 2 . THEOREM XIX . Of all Right Prisms of the Same Altitude , whose Bases are Given in Magnitude ...
Page 44
... Altitudes , Equal Total Surfaces , and Regular Bases , that whose Base has the Greatest Number of Sides , has the Greatest Capacity . And , in particular , a Right Cylinder is Greater than any Right Prism of Equal Altitude and Equal ...
... Altitudes , Equal Total Surfaces , and Regular Bases , that whose Base has the Greatest Number of Sides , has the Greatest Capacity . And , in particular , a Right Cylinder is Greater than any Right Prism of Equal Altitude and Equal ...
Common terms and phrases
abscissas altitude ANHG asymptotes axis ball base beam becomes bisect CA² CE² centre circle circumscribed coefficients cone conic section consequently Corol cosine cubic equation curve cylinder DE² denote determine diameter distance divided draw drawn equa equal equation expression feet find the fluent fluxion force greatest Hence horizontal hyperbola inches length logarithm manner measured meridian motion nearly ordinates parabola parallel perimeter perpendicular plane polygon prism prob PROBLEM proportional quadrant quantity radius rectangle resistance right angles right line roots Scholium sides sin² sine solid angle sphere spherical angle spherical excess spherical triangle spherical trigonometry square suppose surf surface tangent theor THEOREM theref tion trapezium velocity vertical weight whence whole
Popular passages
Page 63 - 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.
Page 114 - Since the exterior angle of a triangle is equal to the sum of the two interior opposite angles (th.
Page 247 - Or, by art. 3 14 of the same, the pressure is equal to the weight of a column of the fluid, •whose base is equal to the surface pressed, and...
Page 80 - A solid angle is that which is made by the meeting of more than two plane angles, which are not in the same plane, in one point. X. ' The tenth definition is omitted for reasons given in the notes.
Page 333 - ... to secure uniformity, his trees were all felled in the same season of the year, were squared the day after, and the experiments tried the 3d day.
Page 164 - Cor. 3. An equation will want its third term, if the sum of the products of the roots taken two and two, is partly positive, partly negative, and these mutually destroy each other. Remark.
Page 162 - ... preceding equation is only of the fourth power or degree ; but it is manifest that the above remark applies to equations of higher or lower dimensions : viz. that in general an equation of any degree whatever has as many roots as there are units in the exponent of the highest power of the unknown quantity, and that each root has the property of rendering, by its substitution in place of the unknown quantity, the aggregate of all the terms of the equation equul to nothing.
Page 72 - Prove that, in any plane triangle, the base is to the difference of the other two sides, as the sine of half the sum of the angles at the base, to the sine of half their difference : also, that the...
Page 259 - And when this is compared with the proportion of the velocity and length of gun in the last paragraph, it is evident that we gain extremely little in the range by a great increase in the length of the gun, with the same charge of powder. In fact the range is nearly as the 5th root of the length of the bore ; which is so small an increase, as to amount only to about a...
Page 72 - Prob. 12. How must three trees, A, B, C, be planted, so that the angle at A may be double the angle at B, the angle at B double the angle at C, and a line of 400 yards may just go round them ? Ans.