Cups are used as measurements in cooking. Spoons are also used as a measurement in cooking. Some other cooking measurements include ounces, pounds, and liters.
One of the easiest places to find processor benchmarks charts for your computer would be online. One such site that offers these is called CPUBenchmarks.
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LINPACK benchmarks was created in 1979.
CPU benchmarks are numbers that are used to measure how well a computer functions. It is not usually the most accurate and not to be used to tell accuracy one hundred percent.
That's the temperature at which water freezes, one of the benchmarks of the scale.
The benchmarks in math are like tests to see if you understand and if the teacher teaches it good for you to understand
Benchmarks - 2012 was released on: USA: 19 August 2012 (Action On Film International Film Festival)
It is the boiling point of water under standard conditions and one of the benchmarks of the scale.
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You have every right to be concerned, the descriptions "decimal benchmarks" and "fraction benchmarks" are open to many interpretations. In this case, make your own [reasonable] interpretations. If the fractional benchmarks where 1/100 , this is an exact fraction 23/100. If they are taken to be 1/2, 1/4, 1/5, etc., .23 is closer to 1/4, than any other, BUT it is also closer still to 2/9 [hence the confusion]. For decimal benchmarks, there is less confusion, but it is still there. If the benchmarks are .1, .2, .3, .4, .5, .6, .7, .8, .9 etc., the nearest one is .2. If the benchmarks are further refined [between .2 and .3], with .21, .22, .23, .24, ... then .23 coincides with a benchmark. This is not my work I got it from anthony@yahoo.com
You have every right to be concerned, the descriptions "decimal benchmarks" and "fraction benchmarks" are open to many interpretations. In this case, make your own [reasonable] interpretations. If the fractional benchmarks where 1/100 , this is an exact fraction 23/100. If they are taken to be 1/2, 1/4, 1/5, etc., .23 is closer to 1/4, than any other, BUT it is also closer still to 2/9 [hence the confusion]. For decimal benchmarks, there is less confusion, but it is still there. If the benchmarks are .1, .2, .3, .4, .5, .6, .7, .8, .9 etc., the nearest one is .2. If the benchmarks are further refined [between .2 and .3], with .21, .22, .23, .24, ... then .23 coincides with a benchmark. This is not my work I got it from anthony@yahoo.com
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