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= 0.476 961 884 784 m 3: coomb: ≡ 4 bu (imp) = 0.145 474 88 m 3: cord : ≡ 8 ft × 4 ft × 4 ft = 3.624 556 363 776 m 3: cord-foot: ≡ 16 cu ft = 0.453 069 545 472 m 3: cubic fathom: cu fm ≡ 1 fm × 1 fm × 1 fm = 6.116 438 863 872 m 3: cubic foot: ft 3: ≡ 1 ft × 1 ft × 1 ft ≡ 0.028 316 846 592 m 3: cubic inch: in 3: ≡ 1 in × 1 ...
By default, the output value is rounded to adjust its precision to match that of the input. An input such as 1234 is interpreted as 1234 ± 0.5, while 1200 is interpreted as 1200 ± 50, and the output value is displayed accordingly, taking into account the scale factor used in the conversion.
{{convert|123|cuyd|m3+board feet}} → 123 cubic yards (94 m 3; 40,000 board feet) The following converts a pressure to four output units. The precision is 1 (1 decimal place), and units are abbreviated and linked.
Plot of probit function. In probability theory and statistics, the probit function is the quantile function associated with the standard normal distribution.It has applications in data analysis and machine learning, in particular exploratory statistical graphics and specialized regression modeling of binary response variables.
1.0 rd (17 ft; 5.0 m) pole: pole (none) equivalent to a rod 1.0 pole (17 ft; 5.0 m) perch: perch (none) equivalent to a rod 1.0 perch (17 ft; 5.0 m) fathom: fathom (none) assumes 1 fathom ≡ 6 ft 1.0 fathom (6.0 ft; 1.8 m) yard: yd yd assumes the international definition 1.0 yd (0.91 m) yd m; foot: ft (foot) ft long code "foot" outputs foot ...
The basic unit of length in the imperial and U.S. customary systems is the yard, defined as exactly 0.9144 m by international treaty in 1959. [2] [10] Common imperial units and U.S. customary units of length include: [11] thou or mil (1 ⁄ 1000 of an inch) inch (25.4 mm) foot (12 inches, 0.3048 m) yard (3 feet, 0.9144 m)
The probit model is usually credited to Chester Bliss, who coined the term "probit" in 1934, [8] and to John Gaddum (1933), who systematized earlier work. [9] However, the basic model dates to the Weber–Fechner law by Gustav Fechner , published in Fechner (1860) , and was repeatedly rediscovered until the 1930s; see Finney (1971 , Chapter 3.6 ...
Sector 3: 34 4 Sector 4: 34 5 Sector 2: 32 6 Sector 5: 30 List of sectors by population. Rank Sector Population (October 2011) 1 Sector 3: 385,439 2 Sector 6: 367,760 3