0
often that only happens in division. for example, 10 ÷ 3 = 3.33333333333(so on).
the reason for this is because, think of it in money. one dollar can buy 3 lollie pops. this means the lollie pops must be an equal amount. if they were 30¢ each, then 3 lollie pops would cost 90¢. if they were 33¢ each, 3 would cost 99¢. if they were 33.33333¢ each, 3 would cost 99.99999¢ each (I know, no such things as fractions of pennies. I'm using it as an example). so that makes the 3.33333's unlimited.
does that help any? =D
What else can I help you with?
What is the difference between significant figures and significant digits in numerical calculations?
Significant figures and significant digits are terms used in numerical calculations to indicate the precision of a number. Significant figures refer to all the digits in a number that are known with certainty, including both non-zero digits and zeros that are between non-zero digits or at the end of a decimal. Significant digits, on the other hand, refer to all the non-zero digits in a number, excluding any leading or trailing zeros. In essence, significant figures provide a more accurate representation of the precision of a number compared to significant digits.
How do you multiply numbers while considering significant digits?
When multiplying numbers with significant digits, count the total number of significant digits in each number being multiplied. The result should have the same number of significant digits as the number with the fewest significant digits. Round the final answer to that number of significant digits.
How many significant digits are in the number 1.071?
There are four significant digits in the number 1.071.
What is the difference between significant figures and decimal places in numerical values?
Significant figures represent the precision of a measurement, including all certain digits and one uncertain digit. Decimal places indicate the number of digits to the right of the decimal point. Significant figures are based on the accuracy of the measurement, while decimal places are based on the scale of the number.
Which digits in 0.00139 are significant?
1, 3, and 9 all are significant. The zeros are merely place holders and thus, not significant.
How can you determine significant digits?
The number of significant digits is the length of the numerical string from the first to the last non-zero digits in a number.The number if significant digits in 9807600, or 0.0012021 is 5.
What is the difference between significant figures and significant digits in numerical calculations?
Significant figures and significant digits are terms used in numerical calculations to indicate the precision of a number. Significant figures refer to all the digits in a number that are known with certainty, including both non-zero digits and zeros that are between non-zero digits or at the end of a decimal. Significant digits, on the other hand, refer to all the non-zero digits in a number, excluding any leading or trailing zeros. In essence, significant figures provide a more accurate representation of the precision of a number compared to significant digits.
What is the numerical status of 1.237 billion?
It is a rational number rounded to 4 significant digits.
Why is 5 dogs an unlimited significant digit?
Five dogs can be considered to have an unlimited number of significant digits because the zero after the decimal point can be considered significant. As a result, the number 5.0 dogs has an indefinite number of significant digits.
Can you explain the meaning of significant digits in measurement?
Significant digits in measurement refer to the digits in a number that carry meaning or contribute to the precision of the measurement. They indicate the level of accuracy or certainty in a measurement, with each significant digit representing a reliable and known value.
What is the number of significant figures in 10057?
There are 5 significant figures in 10057.-----------------When are Digits Significant? Non-zero digits are always significant. Thus, 22 has two significant digits, and 22.3 has three significant digits. With zeroes, the situation is more complicated: # Zeroes placed before other digits are not significant; 0.046 has two significant digits. # Zeroes placed between other digits are always significant; 4009 kg has four significant digits. # Zeroes placed after other digits but behind a decimal point are significant; 7.90 has three significant digits. # Zeroes at the end of a number are significant only if they are behind a decimal point as in (c). Otherwise, it is impossible to tell if they are significant. For example, in the number 8200, it is not clear if the zeroes are significant or not. The number of significant digits in 8200 is at least two, but could be three or four. To avoid uncertainty, use scientific notation to place significant zeroes behind a decimal point: 8.200 ´103 has four significant digits 8.20 ´103 has three significant digits 8.2 ´103 has two significant digitsSignificant Digits in Multiplication, Division, Trig. functions, etc. In a calculation involving multiplication, division, trigonometric functions, etc., the number of significant digits in an answer should equal the least number of significant digits in any one of the numbers being multiplied, divided etc. Thus in evaluating sin(kx), where k = 0.097 m-1 (two significant digits) and x = 4.73 m (three significant digits), the answer should have two significant digits. Note that whole numbers have essentially an unlimited number of significant digits. As an example, if a hair dryer uses 1.2 kW of power, then 2 identical hairdryers use 2.4 kW: 1.2 kW {2 sig. dig.} ´2 {unlimited sig. dig.} = 2.4 kW {2 sig. dig.}
How many digits has the number 12345?
It has five digits each of them representing numerical quantities
What is 76047150 8725621?
It is a numerical string of eight digits followed by another of 7 digits.
What is significant notation?
Significant notation refers to the use of significant figures in numerical data to convey precision in measurements. It indicates which digits in a number are meaningful and contribute to its accuracy, typically including all non-zero digits, any zeros between significant digits, and trailing zeros in a decimal context. This notation helps communicate the reliability of the data and is crucial in scientific and technical fields to avoid misinterpretation of results.
How many significant digits are in 123.09?
Five. All nonzero digits are significant and zeros in between significant digits are significant.
How many significant digits are in 20.009?
Five. All nonzero digits are significant and zeros in between significant digits are always significant.
How many significant digits are there in 6.0076?
Five. All nonzero digits are significant and zeros in between significant digits are always significant.
