The Principles of the Solution of the Senate-house 'riders,' Exemplified by the Solution of Those Proposed in the Earlier Parts of the Examinations of the Years 1848-1851Macmillan & Company, 1851 - 116 sider |
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Side 73
... volume of the solid of which ABR is a vertical section , volume of rectangular box ABRL , = { AB2 . BR , = α . σα , = 10a3 . Again , to determine the point of application of the fluid pressures on AB is nothing more than to determine ...
... volume of the solid of which ABR is a vertical section , volume of rectangular box ABRL , = { AB2 . BR , = α . σα , = 10a3 . Again , to determine the point of application of the fluid pressures on AB is nothing more than to determine ...
Side 75
... volume of the water remains the same gives or y ( area of base of cylinder ) = volume of cork immersed , Y.πT Y • 24 π • 24 ( . radius of the base of the cylinder = 1 ) , Now the increased pressure on the curved surface will clearly be ...
... volume of the water remains the same gives or y ( area of base of cylinder ) = volume of cork immersed , Y.πT Y • 24 π • 24 ( . radius of the base of the cylinder = 1 ) , Now the increased pressure on the curved surface will clearly be ...
Side 76
... volume to that of an equal volume of some standard substance whose specific gravity is taken as unity . Hence , water being taken as the standard substance , 1.12 specific gravity of coal water weight of a cubic foot of coal water ...
... volume to that of an equal volume of some standard substance whose specific gravity is taken as unity . Hence , water being taken as the standard substance , 1.12 specific gravity of coal water weight of a cubic foot of coal water ...
Side 77
... volume it occupies , P а II α X But P supports the weight of a column of fluid whose height is x , together with the pressure II on the surface of the fluid ; therefore P = = σ.x + II , = σ ( x + h ) , if h is the height of a column of ...
... volume it occupies , P а II α X But P supports the weight of a column of fluid whose height is x , together with the pressure II on the surface of the fluid ; therefore P = = σ.x + II , = σ ( x + h ) , if h is the height of a column of ...
Side 78
... volume , and the temperature ? ( B ) . A given quantity of air under the pressure of m pounds to the square inch , occupies n cubic inches when the temperature is t ; find how many cubic inches it will occupy under the pressure of m ...
... volume , and the temperature ? ( B ) . A given quantity of air under the pressure of m pounds to the square inch , occupies n cubic inches when the temperature is t ; find how many cubic inches it will occupy under the pressure of m ...
Andre utgaver - Vis alle
The Principles of the Solution of Senate-house 'riders': Exemplified by the ... Francis James Jameson Uten tilgangsbegrensning - 1851 |
The Principles of the Solution of the Senate-House 'Riders: Exemplified by ... Francis J. Jameson Ingen forhåndsvisning tilgjengelig - 2018 |
The Principles of the Solution of the Senate-House 'Riders: Exemplified by ... Francis J. Jameson Ingen forhåndsvisning tilgjengelig - 2015 |
Vanlige uttrykk og setninger
AC² AN.NM Arithmetic arithmetical progression axis bisects body C₁ Cambridge centre of gravity chord CHURCHILL BABINGTON circle cloth cone Conic Sections conjugate hyperbola constant curvature curve cycloid describe diameter direction directrix distance drawn Edition ellipse equations equilibrium Fellow of St fluid focus geometrical given point Hence horizontal hyperbola inches inclined inscribed John's College joining latus-rectum least common multiple Lemma length locus meet mirror move number of seconds oscillation parabola parallel parallelogram particle perpendicular plane polygon pressure prop proportional proposition prove pullies quadrilateral quantity radius ratio rays rectangle refraction right angles sewed shew sides specific gravity spherical square straight line string surface tan² tangent triangle ABC Trinity College tube V₁ vary vertex vertical W₁ weight
Populære avsnitt
Side 4 - To divide a given straight line into two parts, so that the rectangle contained by the whole and one of the parts, shall be equal to the square of the other part.
Side 6 - The angle at the centre of a circle is double of the angle at the circumference upon the same base, that is, upon the same part of the circumference.
Side 11 - AB is a diameter, and P any point in the circumference of a circle; AP and BP are joined and produced if necessary ; if from any point C of AB, a perpendicular be drawn to AB meeting AP and .BP in points D and E respectively, and the circumference of the circle in a point F, shew that CD is a third proportional of CE and CF.
Side 9 - IF the angle of a triangle be divided into two equal angles, by a straight line which also cuts the base; the segments of the base shall have the same ratio which the other sides of the triangle have to one another...
Side 4 - In any right-angled triangle, the square which is described upon the side subtending the right angle, is equal to the squares described upon the sides which contain the right angle.