Suppose we break a whole into 10 equal parts; each part then represents $\frac{1}{10}$ of the whole or one-tenth of the whole, which is mathematically written as 0.1. Further, if we break each of these tenths into 10 equal parts, each part will represent $\frac{1}{100}$ of the whole or one-hundredth of the whole.
Step 1 0.001 / 100 × 100 We divide 0.001 ( point zero zero one) by 100 (one hundred) then multiply the result by 100 (one hundred ). Step 2 = 1.0E-5 × 100 0.001 divided by 100 equals 1.0E-5 (1.0 times 10 to the negative 5th power).
Carat weight is the easiest to understand of the Cs. A diamond's weight is measured in carats. The carat is subdivided into 100 equal parts called 'points.'. One point equals .01 carat or 1/100 carat. A half‐carat diamond is 50 points. A one carat diamond equals 100 points. Carat weight may be expressed in both fractions and in decimal numbers.
See below how to convert this mixed number to a decimal: Step 1: divide numerator (25) by the denominator (100): 25 ÷ 100 = 0.25. Step 2: add this value to the the integer part: 1 + 0.25 = 1.25. So, 1 25 / 100 = 1.25. Approximated Values: 1 25 / 100 = 1 rounded to 1 significant figure.
2. A Boeing 737-500 jet aircraft. The Boeing 737-500 jet aircraft is one of the smaller 737 models offered by Boeing and has a length of almost exactly 100 feet. The 737-500 aircraft was launched by Southwest Airlines in 1987 when they placed an order of 20 aircraft. The first one flew for them in 1990.
If a 1 = 1 and a n + 1 − 3 a n + 2 = 4 n for every positive integer n, then a 100 equals. View Solution. Q3. The coefficient of x 100 in the expansion of
Calorie, a unit of energy or heat variously defined. The calorie was originally defined as the amount of heat required at a pressure of 1 standard atmosphere to raise the temperature of 1 gram of water 1° Celsius. Since 1925 this calorie has been defined in terms of the joule, the definition since.
I ask this question because I get to know about the number $10^{100}$ on how big it is more often than $100!$. If $100!$ is bigger than $10^{100}$, then why don't we give more focus to $100!$ than the other number? Because for me, $100!$ looks simple.
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1 100 is equal to
