A collection of problems and examples adapted to the 'Elementary course of mathematics'.J. & J.J. Deighton, 1847 - 80 sider |
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Resultat 1-5 av 18
Side 54
... base AB ; and the difference of the segments of the base made by the perpendicular ; find the sides of the triangle . 4 . Given the vertical angle , the perpendicular let fall from the vertical angle on the base , and the rectangle ...
... base AB ; and the difference of the segments of the base made by the perpendicular ; find the sides of the triangle . 4 . Given the vertical angle , the perpendicular let fall from the vertical angle on the base , and the rectangle ...
Side 55
... solve the triangle . 21. If a perpendicular be let fall from the vertex of any triangle on the base , the rectangle under the sides of the triangle is equal to the rectangle under the perpendicular and TRIGONOMETRY . 55.
... solve the triangle . 21. If a perpendicular be let fall from the vertex of any triangle on the base , the rectangle under the sides of the triangle is equal to the rectangle under the perpendicular and TRIGONOMETRY . 55.
Side 56
... base , the vertical angle , and the difference of the sides ; find the remaining angles . 30. The sides of a triangle are in arithmetical pro- gression , and its area is to that of an equilateral triangle of the same perimeter as 3 : 5 ...
... base , the vertical angle , and the difference of the sides ; find the remaining angles . 30. The sides of a triangle are in arithmetical pro- gression , and its area is to that of an equilateral triangle of the same perimeter as 3 : 5 ...
Side 57
... base measured on the earth's surface . Find an expression for the height of the balloon . 3. In order to ascertain the height of a mountain , a base was measured of 2761 feet , and at either extremity of this base were taken the angles ...
... base measured on the earth's surface . Find an expression for the height of the balloon . 3. In order to ascertain the height of a mountain , a base was measured of 2761 feet , and at either extremity of this base were taken the angles ...
Side 58
... base AD of a feet , and observes the angle BDC ; he then advances to E , b feet further , and observes that the angle BEC the supplement of BDC . From these observations find the sides . of the triangle . = 8. A person walking from C to ...
... base AD of a feet , and observes the angle BDC ; he then advances to E , b feet further , and observes that the angle BEC the supplement of BDC . From these observations find the sides . of the triangle . = 8. A person walking from C to ...
Vanlige uttrykk og setninger
a²b a³b ab² ab³ angle of incidence angular arithmetical mean arithmetical series axis base beam body is projected centre of gravity circle coefficient concave convex lens cos² cosec cube cylinder distance Divide double convex lens elastic ball equal equation feet find the angle find the focal find the height Find the number find the value focal length focus force fulcrum geometrical progression given point given weight harmonical mean horizontal plane inches inclined plane inscribed latus rectum luminous point miles mirror Multiply observed parallel perpendicular placed polygon prism Prove pully quantities radii radius ratio ray of light rays diverging reflexion refracted regular polygon respectively right angle shew sin² specific gravity sphere spherical reflector square string passing subtends Subtract tower vertical plane
Populære avsnitt
Side 23 - A man travelled 105 miles, and then found that if he had not travelled so fast by 2 miles an hour, he should have been 6 hours longer in performing the journey.
Side 22 - B, can perform a piece of work together in 16 days. They work together for 4 days, when A being called off, B is left to finish it, which he does in 36 days more. In what time would each do it separately ? Ans. A in 24 days, B in 48 days.
Side 22 - There is a cistern, into which water is admitted by three cocks, two of which are of exactly the same dimensions. When they are all open, five-twelfths of the cistern is filled in four hours; and if one of the equal cocks be stopped, seven-ninths of the cistern is filled in ten hours and forty minutes.
Side 52 - A person standing at the edge of a river observes that the top of a tower on the edge of the opposite side subtends an angle of 55° with a line drawn from his eye parallel to the horizon ; receding backwards 30 feet, he then finds it to subtend an angle of 48°. Determine the breadth of the river. log. sin 7° = 9.08589 log.
Side 32 - At a game of cards, 3 being dealt to each person, any one can have 425 times as many hands as there are cards in the pack. How many cards are there 1 12.
Side 89 - A descends alone ; the pressure of the atmosphere is equal to that of a column of water...
Side 21 - Fifteen guineas should weigh four ounces ; but a parcel of light gold having been weighed and counted, was found to contain 9 more guineas than was supposed from the weight ; and a part of the whole, exceeding the half by four guineas and a half, was found to be 1-^ oz.
Side 31 - If the first has to the second the same ratio which the third has to the fourth...
Side 24 - For every yard of the better sort he gave as many shillings as he had yards in all ; and for every yard of the worse as many shillings as there were yards of the better sort more than of the worse. And the whole price of the better sort was to the whole price of the worse as 72 to 7. How many yards had he of each ? Ans.
Side 94 - There are three plane reflectors, two of which are at right angles to each other, and a ray of light is incident upon the third, and reflected successively by each of them...