12.4 cm
They’re the ‘real value’ of a rounded number. Upper and Lower Bounds are concerned with accuracy. Any measurement must be given to a degree of accuracy, e.g. 'to 1 d.p.', or ' 2 s.f.', etc. Once you know the degree to which a measurement has been rounded, you can then find the Upper and Lower Bounds of that measurement. Phrases such as the 'least Upper Bound' and the 'greatest Lower Bound' can be a bit confusing, so remember them like this: the Upper Bound is the biggest possible value the measurement could have been before it was rounded down; while the Lower Bound is the smallest possible value the measurement could have been before it was rounded up.
300
If the range is the real numbers, it has a lower bound (zero) but no upper bound.
no won noes * * * * * It means that there is an upper and lower bound or limit. There is the lower bound such that you exclude any smaller numbers, and an upper bound such that you exclude bigger numbers. What you do wit hnumbers that are equal to the bounds depends on the nature of the bounds.
The answer depends on the level of accuracy of the value 0.
The lower bound is 0.5 less and the upper bound is 0.5 more.
They’re the ‘real value’ of a rounded number. Upper and Lower Bounds are concerned with accuracy. Any measurement must be given to a degree of accuracy, e.g. 'to 1 d.p.', or ' 2 s.f.', etc. Once you know the degree to which a measurement has been rounded, you can then find the Upper and Lower Bounds of that measurement. Phrases such as the 'least Upper Bound' and the 'greatest Lower Bound' can be a bit confusing, so remember them like this: the Upper Bound is the biggest possible value the measurement could have been before it was rounded down; while the Lower Bound is the smallest possible value the measurement could have been before it was rounded up.
6.42 m and 5.97 m( both to the nearest cm)
300
Lower bound is 17.6 and upper bound is 17.8
A function whose upper bound would have attained its upper limit at a bound. For example, f(x) = x - a whose domain is a < x < b The upper bound is upper bound is b - a but, because x < b, the bound is never actually attained.
The answer is B.
It is 57.5 mm.
An upper bound estimate is a estimate that is greater than the actual solution.
Let (B, ≤) be a partially ordered set and let C ⊂ B. An upper bound for C is an element b Є Bsuch that c ≤ b for each c Є C. If m is an upper bound for C, and if m ≤ b for each upper bound b of C, then m is a least upper bound of C. C can only have one least upper bound, and it may not have any at all (depending on B). The least upper bound of a set C is often written as lub C.See related links for more information.
I assume you are talking in terms of rounding, in which case subtract/add half the value to which the number is rounded to get the lower and upper bounds, and then the lower bound is inclusive and the upper bound is exclusive:To the nearest whole number: 999.5 ≤ x < 1000.5To the nearest 2: 999 ≤ x < 1001To the nearest 4: 998 ≤ x < 1002To the nearest 5: 997.5 ≤ x < 1002.5To the nearest 8: 996 ≤ x < 1004To the nearest 10: 995 ≤ x < 1005To the nearest 20: 990 ≤ x < 1010To the nearest 25: 987.5 ≤ x < 1012.5To the nearest 40: 980 ≤ x < 1020To the nearest 50: 975 ≤ x < 1025To the nearest 100: 950 ≤ x < 1050To the nearest 125: 937.5 ≤ x < 1067.5To the nearest 200: 900 ≤ x < 1100To the nearest 250: 875 ≤ x < 1125To the nearest 500: 750 ≤ x < 1250To the nearest 1000: 500 ≤ x < 1500
Big O gives an upper bound whereas big theta gives both an upper bound and a lower bound.