Sentences with phrase «diameter circling at»

The researchers had stumbled upon the ocean's equivalent of a cyclone, a patch of water roughly 15 kilometers in diameter circling at the speed of a walking person.

The fin glides leisurely at first; then it gains speed, almost imperceptibly, as the circle's diameter shrinks around you.

Starting at the center, quickly make concentric circles of increasing diameter with the ladle.

Working with one piece of dough at a time (and leaving the others in the refrigerator) roll it into a thin circle 8 1/2 to 9 inches in diameter on a lightly floured work surface.

on a lightly floured surface, working with one piece at a time, smash dough with hands into a rough circle, about 5 inches diameter.

Using a lightly floured rolling pin, roll out the crust dough into a circle at least 12 inches in diameter and gently fold pie crust into quarters.

At the end of your pumping session, use the circles to measure the diameter of your nipple at the basAt the end of your pumping session, use the circles to measure the diameter of your nipple at the basat the base.

They appear to be at very similar distances from us — around 7 billion light years — in a circle 36 ° across on the sky, or more than 70 times the diameter of the Full Moon.

The new discovery, Kepler - 452b, fires the planet hunter's imagination because it is the most similar to the Earth - sun system found yet: a planet at the right temperature within the habitable zone, and only about one - and - a-half times the diameter of Earth, circling a star very much like our own sun.

objectives include: Year 6 objectives • solve problems involving the calculation and conversion of units of measure, using decimal notation up to 3 decimal places where appropriate • use, read, write and convert between standard units, converting measurements of length, mass, volume and time from a smaller unit of measure to a larger unit, and vice versa, using decimal notation to up to 3 decimal places • convert between miles and kilometres • recognise that shapes with the same areas can have different perimeters and vice versa • recognise when it is possible to use formulae for area and volume of shapes • calculate the area of parallelograms and triangles • calculate, estimate and compare volume of cubes and cuboids using standard units, including cubic centimetres (cm ³) and cubic metres (m ³), and extending to other units [for example, mm ³ and km ³] • express missing number problems algebraically • find pairs of numbers that satisfy an equation with 2 unknowns • enumerate possibilities of combinations of 2 variables • draw 2 - D shapes using given dimensions and angles • recognise, describe and build simple 3 - D shapes, including making nets • compare and classify geometric shapes based on their properties and sizes and find unknown angles in any triangles, quadrilaterals, and regular polygons • illustrate and name parts of circles, including radius, diameter and circumference and know that the diameter is twice the radius • recognise angles where they meet at a point, are on a straight line, or are vertically opposite, and find missing angles • describe positions on the full coordinate grid (all 4 quadrants) • draw and translate simple shapes on the coordinate plane, and reflect them in the axes • interpret and construct pie charts and line graphs and use these to solve problems • calculate and interpret the mean as an average • read, write, order and compare numbers up to 10,000,000 and determine the value of each digit • round any whole number to a required degree of accuracy and more!

Generally, road holding is measured as the highest speed a vehicle can maintain without losing adhesion while maintaining the given diameter of a large circle (e.g., 250 feet, 300 feet, etc.) or the g - force generated at that speed.

With its angled inner faces, the belt can circle the angled pulley faces at varying diameters depending on the pulley width, which alters the effective ratio between the pulleys.

With its angled inner faces, the belt can circle the angled pulley faces at varying diameter depending on the pulley width, which alters the effective ratio between the pulleys.

To examine the reflections we bounced a tiny 3 mm in diameter highly collimated pencil beam of light at 45 degrees to the screen and photographed the reflected beams, which appear as overlapping circles in the photos below.

The paintings in his exhibition at Telescope, Irrational · Transcendent, are based on Pi, a mathematical constant that is the ratio of a circle's circumference to it's diameter.

Curiously, the diameter of each circle is approximately 39 inches, which, at 19.5 inches per side, leaves each quarter just a little short of the traditional squares, whose sides measure 19.7 inches.