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1.Look at the number and note where the decimal point is located

2. If it is a whole number the decimal point is at the end

3. move the decimal point to the left and place just after the first number

4. count the number of places you moved the decimal

5. The scientific notation is the number in step 3 times 10 to the power of step 4

Example:

6,000,000 = 6 times 10 to the sixth power

4,910,000.1 = 4.9100001 times ten to the sixth power

59,100 = 5.91 times ten tot he fifth power

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Q: What are the steps in writing number in scientific notation?

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Scientific notation is not a problem that needs to be "solved".

The steps, in order, will depend on what you wish to do: convert from normal to scientific notation, the converse, perform one of the basic operations of arithmetic on numbers in scientific notation.

6 x 10-3.

Scientific notation doesn't exactly have a lot of steps, but I will discuss how it is done. Let us say, you want to convert the number 1,300,000,000 to scientific notation. First, count the number of digits. It turns out to be a ten digit number. Then we observe that the first two digits are not zeroes. So in scientific notation this turns out to be 1.3 x 109. This works out, because we are taking a 1 digit number with another number past the decimal point, 1.3, and then adding another 9 zeroes by use of the term 109 which thereby gives us the equivalent of the original ten digit number that we started with.

5

analyze and figure it out with your opnion

covert this number into a standard notation 18.4 can you give me the steps how you would covert this.

There are not seven steps unless you start counting steps like "pick up pen"! Three steps is all that it takes.

The answer depends on which steps you consider to be the first three. The sequence can vary.

Writing up and getting the results published.

Scientific notation numbers begin with the digits from 1 to 9 followed by a decimal point as the examples show:- 925,000,000 = 9.25*108 because it can change back to 925,000,000 by moving the decmal point 8 places to the right 0.0000025 = 2.5*10-6 because it can change back to 0.0000025 by moving the decimal point 6 places to the left

6.022 X 1023 - 6.022 X 1022 = 5.419 X 1023 ======================

Addition and Subtraction in Scientific NotationA number written in scientific notation is written as the product of a number between 1 and 10 and a number that is a power of 10. That is, it is written as a quantity whose coefficient is between 1 and 10 and whose base is 10.Addition and SubtractionOne of the properties of quantities with exponents is that numbers with exponents can be added and subtracted only when they have the same base and exponent. Since all numbers in scientific notation have the same base (10), we need only worry about the exponents. To be added or subtracted, two numbers in scientific notation must be manipulated so that their bases have the same exponent--this will ensure that corresponding digits in their coefficients have the same place value.Multiplying a number by another number with the same base is equivalent to multiplying their coefficients and adding their exponents. Therefore, if we want to add two quantities written in scientific notation whose exponents do not match, we can simply write one of the powers of 10 as the product of two smaller powers of 10 , one of which agrees with the other term.Alternately, if we want to preserve the exponent of the term with the larger power of 10 , we can simultaneously multiply and divide the other term by a power of 10 , applying the rule for multiplication of exponents in one case and dividing the coefficient in the other. It is this procedure that we outline below. Once the numbers have the same base and exponents, we can add or subtract their coefficients.Here are the steps to adding or subtracting numbers in scientific notation :1. Determine the number by which to increase the smaller exponent by so it is equal to the larger exponent.2. Increase the smaller exponent by this number and move the decimal point of the number with the smaller exponent to the left the same number of places. (i.e. divide by the appropriate power of 10 .)3. Add or subtract the new coefficients.4. If the answer is not in scientific notation (i.e. if the coefficient is not between 1 and 10) convert it to scientific notation.Multiplication and Division in Scientific Notation Multiplication and DivisionQuantities with exponents can be multiplied and divided easily if they have the same base. Since all number in scientific notation have base 10 , we can always multiply them and divide them.To multiply two numbers in scientific notation, multiply their coefficients and add their exponents. To divide two numbers in scientific notation, divide their coefficients and subtract their exponents. In either case, the answer must be converted to scientific notation.Here are the steps to multiply two numbers in scientific notation:1. Multiply the coefficients--round to the number of significant figures in the coefficient with the smallest number of significant figures.2. Add the exponents.3. Convert the result to scientific notation.Here are the steps to divide two numbers in scientific notation:1. Divide the coefficients--round to the number of significant figures in the coefficient with the smallest number of significant figures.2. Subtract the exponents.3. Convert the result to scientific notation.

Steps in scientific notation 1. Identify the location of the decimal point. 2. Move the decimal point, stop moving after 1st none zero digit, stop moving the non zero digit, 3. Identify the multiplying factor 4. Identify the exponent

This question is impossible to answer since, in the UK, the two things are exactly the same! So the steps are: sit back, do nothing!

Addition and Subtraction in Scientific NotationA number written in scientific notation is written as the product of a number between 1 and 10 and a number that is a power of 10 . That is, it is written as a quantity whose coefficient is between 1 and 10 and whose base is 10 .Addition and SubtractionOne of the properties of quantities with exponents is that numbers with exponents can be added and subtracted only when they have the same base and exponent. Since all numbers in scientific notation have the same base (10), we need only worry about the exponents. To be added or subtracted, two numbers in scientific notation must be manipulated so that their bases have the same exponent--this will ensure that corresponding digits in their coefficients have the same place value.Multiplying a number by another number with the same base is equivalent to multiplying their coefficients and adding their exponents. Therefore, if we want to add two quantities written in scientific notation whose exponents do not match, we can simply write one of the powers of 10 as the product of two smaller powers of 10 , one of which agrees with the other term.Alternately, if we want to preserve the exponent of the term with the larger power of 10 , we can simultaneously multiply and divide the other term by a power of 10 , applying the rule for multiplication of exponents in one case and dividing the coefficient in the other. It is this procedure that we outline below. Once the numbers have the same base and exponents, we can add or subtract their coefficients.Here are the steps to adding or subtracting numbers in scientific notation :1.Determine the number by which to increase the smaller exponent by so it is equal to the larger exponent.2.Increase the smaller exponent by this number and move the decimal point of the number with the smaller exponent to the left the same number of places. (i.e. divide by the appropriate power of 10 .)3.Add or subtract the new coefficients.4.If the answer is not in scientific notation (i.e. if the coefficient is not between 1 and 10 ) convert it to scientific notation.Multiplication and Division in Scientific NotationMultiplication and DivisionQuantities with exponents can be multiplied and divided easily if they have the same base. Since all number in scientific notation have base 10 , we can always multiply them and divide them.To multiply two numbers in scientific notation, multiply their coefficients and add their exponents. To divide two numbers in scientific notation, divide their coefficients and subtract their exponents. In either case, the answer must be converted to scientific notation.Here are the steps to multiply two numbers in scientific notation:1.Multiply the coefficients--round to the number of significant figures in the coefficient with the smallest number of significant figures.2.Add the exponents.3.Convert the result to scientific notation.Here are the steps to divide two numbers in scientific notation:1.Divide the coefficients--round to the number of significant figures in the coefficient with the smallest number of significant figures.2.Subtract the exponents.3.Convert the result to scientific notation.

Scientific notation is a way of representing numbers, usually very large or very small, in the form a*10^b where 1

describe steps of scientific method

The standard (or scientific) notation comes in two parts:the mantissa, a is a number in decimal form such that 1 Ã¢â€°Â¤ a < 10and the exponent, b, which is an integer.Given any number, write it so that the decimal point is after the first non-zero digit. Next, calculate the number of digits that you moved the decimal point. The number of places determines the value of b. If you moved the decimal point to the left then b is positive, if to the right, b is negative and if you did not move it at all, b is 0.Examples:2345.6 = 2.3456*1030.00234 = 2.45*10-3

steps

enumerate the steps of scientific method

Scientific notation is a way of representing numbers, usually very large or very small, in the form a*10^b where 1 â‰¤ |a| < 10 is a decimal number and b is an integer (negative or positive). a is called the mantissa and b is called the exponent. To convert a number to scientific notation: Â· If the number has no decimal point, then add one at the end. Â· Then move the decimal point to just after the first digit while counting the number of places you have moved it. Â· The mantissa of the new number, formed after moving the decimal point is a. Â· If the original number is negative, then so is a. Â· The number of places to the left that the decimal point was moved is b. If it was moved to the right, then b is negative.

what are the steps in writing significant figure

The nine steps of the scientific method se

seven steps are there in the scientific methods