Engineers' and Mechanics' Pocket-book ... |
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Page 175
... moving through a fluid is in proportion to the square of the velocity . The resistance that any plane surface encounters in moving through a fluid with any velocity is equal to the weight of a column whose height is the space a body ...
... moving through a fluid is in proportion to the square of the velocity . The resistance that any plane surface encounters in moving through a fluid with any velocity is equal to the weight of a column whose height is the space a body ...
Page 178
... moving force in lbs . at the centre of the apertures . EXAMPLE . If the fall be 18 feet from the head to the centre of the apertures , then the arm must not be less than 2 feet ( as of 18 = 2 ) , √2.613651.107 , the time of a ...
... moving force in lbs . at the centre of the apertures . EXAMPLE . If the fall be 18 feet from the head to the centre of the apertures , then the arm must not be less than 2 feet ( as of 18 = 2 ) , √2.613651.107 , the time of a ...
Page 183
... moving uniformly is represented by the product of the velocity into the time . With momenta , m varies as bv . EXAMPLE . - Two bodies , one of 20 , the other of 10 lbs . , are impelled by the same momentum , say 60. They move uniformly ...
... moving uniformly is represented by the product of the velocity into the time . With momenta , m varies as bv . EXAMPLE . - Two bodies , one of 20 , the other of 10 lbs . , are impelled by the same momentum , say 60. They move uniformly ...
Page 189
... . These centres are in the same point only when the body is symmetrical with regard to the plane of motion , or when it is a solid of revolution , which is com- monly the case . CENTRAL FORCES . ALL bodies moving around a centre or.
... . These centres are in the same point only when the body is symmetrical with regard to the plane of motion , or when it is a solid of revolution , which is com- monly the case . CENTRAL FORCES . ALL bodies moving around a centre or.
Page 190
... moving with different velocities in the same circle , is proportional to the square of the velocity . Thus , the centrifugal force of a body making 10 revolutions in a minute is four times as great as the centrifugal force of the same ...
... moving with different velocities in the same circle , is proportional to the square of the velocity . Thus , the centrifugal force of a body making 10 revolutions in a minute is four times as great as the centrifugal force of the same ...
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Engineers' and Mechanics' Pocket-Book: Containing U. S. and Foreign Weights ... Charles Haynes Haswell No preview available - 2017 |
Common terms and phrases
abscissa angle avoirdupois axis ball base beam body breadth caloric cast iron cent centre of gravity chord of half circle circumference column cone conjugate Convex Surface cosine cube root cubic feet cubic foot cubic inches curve cylinder decimals deflexion denominator depth Diam difference dimensions distance divisor ellipse Epact equal EXAMPLE EXAMPLE.-A EXAMPLE.-How EXAMPLE.-Reduce EXAMPLE.-What feet per second figure find the Area find the Solidity fluid force frustrum given number half the arc heat hour hyperbola less line A B Measures miles minute multiply number of terms ordinate ounces Parabola perpendicular pipe piston plane pressure proportion quantity quotient radius remainder revolutions revolutions per minute revolving RULE RULE.-Divide RULE.-Multiply Saturd'y segment side specific gravity square inch square root steam subtract TABLE Continued temperature thickness transverse triangle ungulas velocity versed sine VULGAR FRACTIONS wheel whole numbers wrought iron
Popular passages
Page 24 - To reduce a mixed number to an improper fraction. RULE. — Multiply the whole number by the denominator of...
Page 81 - Take the length of the keel within board (so much as she treads on the ground) and the breadth within board by the midship beam, from plank to plank, and half the breadth for the depth, then multiply the length by the breadth, and that product by the depth, and divide the whole by 94; the quotient will give the true contents of the tonnage.
Page 32 - ... and to the remainder bring down the next period for a dividend. 3. Place the double of the root already found, on the left hand of the dividend for a divisor. 4. Seek how often the divisor is contained...
Page 56 - As the conjugate diameter is to the transverse, so is the square root of the difference of the squares of the ordinate and...
Page 204 - ... above the upper deck"; the breadth thereof at the broadest part above the main wales, half of which breadth shall be accounted the depth of such vessel, and then deduct from the...
Page 63 - From the square of the diameter subtract the square of the chord, and extract the square root of the remainder. Subtract this root from the diameter, and half the remainder will give the versed sine of half the arc.
Page 37 - If the errors are unlike, divide the sum of the products by the sum of the errors, and the quotient will be the answer.
Page 190 - Secondly, on the supposition that the earth performs an annual revolution around the sun, it is embraced along with the planets, in Kepler's law, that the squares of the times are as the cubes of the distances ; otherwise, it forms an exception, and the only known exception, to this law.
Page 39 - Multiply each payment by its term of credit, and divide the sum of the products by the sum of the payments ; the quotient will be the average term of credit.
Page 1 - Pocket-book, containing United States and Foreign Weights and Measures; Tables of Areas and Circumferences of Circles, Circular Segments, and Zones of a Circle; Squares and Cubes, Square and Cube Roots; Lengths of Circular and Semi-elliptic Arcs ; and Rules of Arithmetic. Mensuration of Surfaces and Solids; the Mechanical...