A Course of Mathematics ...: Designed for the Use of the Officers and Cadets of the Royal Military College, Volume 2C. Glendinning, 1806 - Mathematics |
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Page 92
... feet each , and the rate of DL24 miles = 4752 paces , GT1 mile = 2112 paces , marching 70 paces per minute . rate 65 p . per min . rate 50 p . per min . AB1 mile 2112 p . CD≈ 3 mile = 1584 p . rate of marching 80 p . per min . EG ...
... feet each , and the rate of DL24 miles = 4752 paces , GT1 mile = 2112 paces , marching 70 paces per minute . rate 65 p . per min . rate 50 p . per min . AB1 mile 2112 p . CD≈ 3 mile = 1584 p . rate of marching 80 p . per min . EG ...
Page 214
... feet each , and the rate B of marching 65 paces per minute . CD = 14 miles , in this a battalion extends 210 paces , and the rate of marching is 50 paces per minute . CG L GH = 11⁄2 miles , here a battalion is 204 paces in length , and ...
... feet each , and the rate B of marching 65 paces per minute . CD = 14 miles , in this a battalion extends 210 paces , and the rate of marching is 50 paces per minute . CG L GH = 11⁄2 miles , here a battalion is 204 paces in length , and ...
Page 240
... feet from CO , the point E where it intersects the circle , will be the place of the eye . Calculation . CG 38. 182 , and GO = 21.818 feet , nearly . And 38. 182-21.818 : 38.182 :: 38. 182 : 89.089 CN , from this take CG , and there ...
... feet from CO , the point E where it intersects the circle , will be the place of the eye . Calculation . CG 38. 182 , and GO = 21.818 feet , nearly . And 38. 182-21.818 : 38.182 :: 38. 182 : 89.089 CN , from this take CG , and there ...
Page 250
... feet in the first second of time , 481⁄2 in the next , 80 in the third , and so on , constituting a series of distances in arithmetical progression , the first term being 16 , and com- mon difference 32 Now let f 161⁄2 , d = 3212 , t ...
... feet in the first second of time , 481⁄2 in the next , 80 in the third , and so on , constituting a series of distances in arithmetical progression , the first term being 16 , and com- mon difference 32 Now let f 161⁄2 , d = 3212 , t ...
Page 252
... feet = 72 inches , aud OR 20 inches , then CR 69.166 inches nearly , = b ; whence CF37.47 inches . Hence it appears that when a spherical speculum or burning mirror is exposed to the rays of the sun , all the reflected rays are not ...
... feet = 72 inches , aud OR 20 inches , then CR 69.166 inches nearly , = b ; whence CF37.47 inches . Hence it appears that when a spherical speculum or burning mirror is exposed to the rays of the sun , all the reflected rays are not ...
Other editions - View all
A Course of Mathematics, Vol. 1: Designed for the Use of the Officers and ... Isaac Dalby No preview available - 2018 |
A Course of Mathematics ...: Designed for the Use of the Officers and Cadets ... Isaac Dalby No preview available - 2016 |
Common terms and phrases
Arith arithmetical progression axis bisect body center of gravity center of oscillation center of percussion circle coefficients column completing the square consequently Corol cube cubic curve cylinder denominator denote depth descending described diameter difference direction distance divided divisor ellipse equal equation equilibrio example expression feet per second fluid force fraction fulcrum Geom given gives horizontal inches infinite lever logarithms motion multiplied nearly number of terms ordinate ounces parabola parallel pendulum perpendicular plane pressure proportional quadratic equation quotient radius ratio rectangle reduced respectively right angles SCHOLIUM shot sides sine specific gravity square root subtangent subtracted Suppose surds surface tangent theorem triangle velocity vertex vertical vulgar fraction weight whence whole number
Popular passages
Page 238 - The rectangle contained by the diagonals of a quadrilateral inscribed in a circle is equal to the sum of the two rectangles contained by its opposite sides.
Page 55 - If any number of magnitudes are proportional, any antecedent is to its consequent as the sum of all the antecedents is to the sum of all the consequents.
Page 67 - Multiply the divisor, thus augmented, by the last figure of the root, and subtract the product from the dividend, and to the remainder bring down the next period for a new dividend.
Page 66 - Subtract the power from the given quantity, and divide the first term of the remainder by the...
Page 302 - Every body continues in its state of rest, or uniform motion in a right line, unless it is compelled to change that state by forces impressed upon it.
Page 116 - How much gold of 15, of 17, and of 22 carats fine, must be mixed with 5 oz. of 18 carats fine, so that the composition may be 20 carats fine ? Ans.
Page 134 - The logarithm of any power of a number is equal to the logarithm of the number multiplied by the exponent of the power.
Page 94 - Three lines are in harmonical proportion, when the first is to the third, as the difference between the first and second, is to the difference between the second and third ; and the second is called a harmonic mean between the first and third. The expression 'harmonical proportion...
Page 23 - Divide the less number by the remainder, the last divisor by the last remainder, and so on, till nothing remains. The last divisor will be the greatest common divisor sought.
Page 39 - Any quantity may be transposed from one side of an equation to the other, if, at the same time, its sign, be changed.