First book of mathematicsA. & C. Black, 1872 - 124 sider |
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Resultat 1-5 av 9
Side 4
... CHORD of a circle is a straight line joining any two points of the circumference . The straight lines AB , AD , are chords . 27. A chord is called the chord of either of the arcs whose ends it joins . AB is the chord of the large arc ...
... CHORD of a circle is a straight line joining any two points of the circumference . The straight lines AB , AD , are chords . 27. A chord is called the chord of either of the arcs whose ends it joins . AB is the chord of the large arc ...
Side 5
... chord . The figure AEDB is a segment ; also the figure contained by the straight line AB and the small arc on the other side of it . 30. A SEMICIRCLE is a segment , the chord of which is a diameter . AED and ABD are semicircles . 31. A ...
... chord . The figure AEDB is a segment ; also the figure contained by the straight line AB and the small arc on the other side of it . 30. A SEMICIRCLE is a segment , the chord of which is a diameter . AED and ABD are semicircles . 31. A ...
Side 22
... chord of 60 ° . The distance from B to 60 ° was made equal to CA , the radius ; whence we see that in a circle the chord of 60 ° is equal to the radius . SCALE OF CHORDS . 23 Problem 10 . 86. To 22 FIRST BOOK OF MATHEMATICS ,
... chord of 60 ° . The distance from B to 60 ° was made equal to CA , the radius ; whence we see that in a circle the chord of 60 ° is equal to the radius . SCALE OF CHORDS . 23 Problem 10 . 86. To 22 FIRST BOOK OF MATHEMATICS ,
Side 23
... chords , or line of chords , for a circle of which the radius is equal to CA , or to the chord of 60 ° on the scale . Thus , in the illustrative figure above , with centre B and radius B 30 ° , describe the arc cutting AB in 30 ; with ...
... chords , or line of chords , for a circle of which the radius is equal to CA , or to the chord of 60 ° on the scale . Thus , in the illustrative figure above , with centre B and radius B 30 ° , describe the arc cutting AB in 30 ; with ...
Side 24
... chord of 60 ° from the line of chords , describe the arc EC , cutting AB in C. From C as centre , with a radius equal to the chord of the given number of degrees from the same line of chords , describe an arc cutting the former arc in D ...
... chord of 60 ° from the line of chords , describe the arc EC , cutting AB in C. From C as centre , with a radius equal to the chord of the given number of degrees from the same line of chords , describe an arc cutting the former arc in D ...
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Vanlige uttrykk og setninger
20 feet ABCD acute angle adjacent angles adjacent sides algebra altitude angle equal angular points Ans.-1 acre arc cutting called central angle centre circumference contained denotes describe an arc diagonal divide divisor drawn equal angles equal sides equation equidistant equilateral triangle expressed extract the square ference Find the area Find the length foot formula geometrical truth given angle given line given point given square given straight line given triangle gonal hexagon hypotenuse inches inscribed line joining meet middle point multiply Nonagon Note number of degrees number of sides opposite angles opposite side parallel lines parallelogram pendicular perpendicular plane figure point of bisection poles produced proportion quadrilateral radius equal ratio rectangle rectilineal figure regular polygon rhombus right angles right-angled triangle rood rule sides equal square equal square feet square root square yards subtracted surface tangent trapezium trapezoid unknown quantity
Populære avsnitt
Side 5 - The circumference of every circle is supposed to be divided into...
Side 48 - UPON a given straight line to describe a segment of a circle containing an angle equal to a given rectilineal angle.
Side 3 - A plane rectilineal angle is the inclination of two straight lines to one another, which meet together, but are not in the same straight line.
Side 39 - Parallelograms on the same base, and between the same parallels, are equal to one another.
Side 59 - Quadrilateral ; of five sides a Pentagon ; of six sides a Hexagon ; of seven sides a Heptagon ; of eight sides an Octagon ; of nine sides a Nonagon ; of ten sides a Decagon ; of twelve sides a Dodecagon.
Side 112 - Polygons are those which have more than four sides. They receive particular names from the number of their sides ; thus a pentagon has five sides, a hexagon has six sides, a heptagon seven, an octagon eight, a nonagon nine, a decagon ten, an undecagon eleven, and a dodecagon has twelve sides.
Side 118 - Divide the area by . 7854 and extract the square root of the quotient.
Side 82 - To rearrange an equation you can • add the same quantity to both sides • subtract the same quantity from both sides • multiply both sides by the same quantity • divide both sides by the same quantity.
Side 107 - Find the area of a field in the form of a trapezoid whose altitude is 120 m and whose parallel sides are 130 m and 180 m.
Side 4 - It is a line every point of which is at the same distance from a point within it called the centre.