A Course of Mathematics ...: Designed for the Use of the Officers and Cadets of the Royal Military College, Volum 1C. Glendinning, 1807 |
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Resultat 1-5 av 47
Side 6
... must stand under units , tens under tens , hundreds under hundreds , & c . as in addition . Ex . 1. From 33 Take 22 Difference or remainder 11 9. The method of proving subtraction is to add the ARITHMETIC . Subtraction.
... must stand under units , tens under tens , hundreds under hundreds , & c . as in addition . Ex . 1. From 33 Take 22 Difference or remainder 11 9. The method of proving subtraction is to add the ARITHMETIC . Subtraction.
Side 7
... remainder together , for their sum must evidently be equal to the greater number if the work is right : thus , let the difference of 4356 and 3213 be required . Ex . 2. 4356 Difference 3213 143 Proof 4356 the sum of 3213 and 1143 . 1 10 ...
... remainder together , for their sum must evidently be equal to the greater number if the work is right : thus , let the difference of 4356 and 3213 be required . Ex . 2. 4356 Difference 3213 143 Proof 4356 the sum of 3213 and 1143 . 1 10 ...
Side 8
... remainder that when added to the less number shall give the greater . Thus , from 9875 Take 2301 Rem . 7574 ; here 1 and 4 make 5 , therefore 4 is the remainder ; 0 and 7 make 7 for the remainder ; 3 and 5 make 8 , therefore 5 is the re ...
... remainder that when added to the less number shall give the greater . Thus , from 9875 Take 2301 Rem . 7574 ; here 1 and 4 make 5 , therefore 4 is the remainder ; 0 and 7 make 7 for the remainder ; 3 and 5 make 8 , therefore 5 is the re ...
Side 12
... remainder will be as many units as there are tens in that number ; for example , the nines taken from the tens in 670 will leave 67 units ; and the nines taken from the 6 tens in 67 will leave 6 units , which , with the 7 units , make ...
... remainder will be as many units as there are tens in that number ; for example , the nines taken from the tens in 670 will leave 67 units ; and the nines taken from the 6 tens in 67 will leave 6 units , which , with the 7 units , make ...
Side 13
... remainder . Find how many times the divisor is contained in the remainder DIVISION . Division.
... remainder . Find how many times the divisor is contained in the remainder DIVISION . Division.
Vanlige uttrykk og setninger
angle ACB arith arithmetical arithmetical mean base battalions bisect breadth centre chord ciphers circle circumference consequently corol cosine cube root cubic decimal defilé diameter diff difference distance ditch divided dividend division divisor example farthings feet figure frustum give given line half the arc half the perimeter height Hence horizontal improper fraction inches integer intersection isosceles least common multiple length logarithm mean proportional measure miles mixt number multiplied nearly number of terms opposite angles paces parallel parallelogram perpendicular plane polygon prism pyramid quadrilateral quotient radius ratio rectangle Reduce remainder rhombus right angles right line right-angled triangle scale of equal segment shillings sides similar sine square root subtracted Suppose tangent Theodolite toises VULGAR FRACTIONS whole number yards
Populære avsnitt
Side 100 - Multiply the whole augmented divisor by this last quotient figure, and subtract the product from the said dividend, bringing down to the next period of the given number, for a new dividend. Repeat the same process over again — viz. find another new divisor, by doubling all the figures now...
Side 95 - If the errors are unlike, divide the sum of the products by the sum of the errors, and the quotient will be the answer.
Side 220 - 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.
Side 180 - Magnitudes which coincide with one another, that is, which exactly fill the same space, are equal to one another.
Side 114 - When any number of quantities are proportionals, as one antecedent is to its consequent, so is the sum of all the antecedents to the sum of all the consequents.
Side 189 - A sector, is any part of a circle bounded by an arc, and two radii, drawn to its extremities. A quadrant, or quarter of a circle, is a sector having a quarter part of the circumference for its arc, and the two radii perpendicular to each other.
Side 334 - To find the area of a triangle. RULE.* Multiply the base by the perpendicular height, and half the product will be the area.
Side 165 - To Divide One Number by Another, Subtract the logarithm of the divisor from the logarithm of the dividend, and obtain the antilogarithm of the difference.
Side 211 - If there be any number of proportionals, as one antecedent is to its consequent, so is the sum of all the antecedents to the sum of all the consequents.
Side 207 - Similar rectilineal figures are those which have their several angles equal, each to each, and the sides about the equal angles proportionals. II. " Reciprocal figures, viz. triangles and parallelograms, " are such as have their sides about two of their " angles proportionals in such a manner, that a side