| Thomas Leybourn - Mathematics - 1830 - 630 pages
...3*42753753 &calso perform the same operation with the fraction 45*2534534 £c, where the radix is 6. 2. The sides of a triangle are in arithmetical progression, and its area is to that of an equilateral triangle of the same perimeter as 3 : 5. Find the ratio of the sides, and the... | |
| Miles Bland - Astronomy - 1830 - 394 pages
...produced. 3, 4, 5, and the radius of the inscribed circle is known: determine the area of the triangle. 19. The sides of a triangle are in arithmetical progression, and its area is to that of an equilateral triangle of the same perimeter as 3 : 5. Determine the ratio of the sides, and... | |
| Mathematics - 1836 - 366 pages
...— 4 sin a sin2 ^ ; and explain fully its use in the construction of the Trigonometrical Canon. 64. The sides of a triangle are in arithmetical progression, and its area is to that of an equilateral triangle of the same perimeter as 3 : 5. Find the ratiaof the sides, and the... | |
| John Hymers - Logarithms - 1841 - 244 pages
...•• ™ «» : АС AB sec В АС 20 100* .-. i- РАС = 'i = 0°. 5729577 = 34'. 22",б4. 37. The sides of a triangle are in arithmetical progression, and its area is to that of an equilateral triangle of the same perimeter as 3 to 5. Shew that its largest angle equals... | |
| Alfred Wrigley - 1845 - 222 pages
...of the circumscribing circle, and the three angles. 165. The sides of a triangle are in arithmetic progression, and its area is to the area of an equilateral triangle of the same area as 3 : 5 ; find the ratio of the sides, and the value of the largest angle. 1 66. The... | |
| Harvey Goodwin (bp. of Carlisle.) - Mathematics - 1847 - 136 pages
...Given the base, the vertical angle, and the difference of the sides ; find the remaining angles. 30. The sides of a triangle are in arithmetical progression, and its area is to that of an equilateral triangle of the same perimeter as 3 : 5. Find the ratio of the sides and the... | |
| Alfred Wrigley - 1852 - 344 pages
...where the lines bisecting the angles meet the opposite sides as (a + b)(a + c) (b + c): iabc. 185. The sides of a triangle are in Arithmetical progression,...area is to the area of an equilateral triangle of the same perimeter as 3 : 5 ; find the ratio of the sides, and the value of the greatest angle. 186.... | |
| John Hind - Trigonometry - 1855 - 540 pages
...circles, it is required to prove that where r„ r„ rt are the radii of the escribed circles. 59. The sides of a triangle are in arithmetical progression, and its area is to that of an equilateral triangle of the same perimeter as 3 : 5; prove that the sides are as 3, 5, 7,... | |
| John Hymers - Logarithms - 1858 - 292 pages
...a1 + я? cot' ß -x* cot* a 2bxcotß~ ~' Чах coi ß ~ ' ^ ab (a + b) 5t*a-(a + 6)cof/3' ili 56. The sides of a triangle are in arithmetical progression, and its area is to that of an equilateral triangle of the same perimeter as 3 to 5 ; shew that its largest angle equals... | |
| Isaac Todhunter - 1860 - 318 pages
...whose sides are proportional to has its area and the trigonometrical ratios of its angles rational. 8. The sides of a triangle are in arithmetical progression, and its area is to that of an equilateral triangle of the same perimeter as 3 to 5. Find the ratio of the sides and the... | |
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