Please explain in a more simple way, what I''m supposed to do?
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What are the steps to solve this problem?
0.000027 ÷ 0.000009
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Requirements:
Explain how to use scientific notation to solve the problem.
Describe how to divide numbers written in scientific notation.
Give your final answer in simplest form.
0.000027 ÷ 0.000009
27x10^-6 ÷ 9x10^-6
(27/9)x10^(-6+6)
3
Alrighty then! So, we're looking at dividing two numbers written in scientific notation: 0.000027 ÷ 0.000009. Don't worry, I've got some clownishly simple steps for you to follow:
Step 1: Let's look at the numbers in scientific notation. The first number, 0.000027, can be written as 2.7 x 10^(-5). The second number, 0.000009, can be written as 9 x 10^(-6).
Step 2: Now that we have our numbers in scientific notation, we can divide them. To divide, we simply divide the coefficients (the numbers before the 'x') and subtract the exponents (the little numbers after the 'x').
So, dividing 2.7 by 9 gives us 0.3 (because 2.7 ÷ 9 = 0.3), and subtracting the exponents -5 and -6 gives us -5 - (-6) = -5 + 6 = 1.
Step 3: Lastly, we write down our final answer in the simplest form. So, 0.3 x 10^(1) can be simplified to just 3 x 10^(0).
And there you have it! The answer to 0.000027 ÷ 0.000009 in simplest form is 3 x 10^(0), or simply 3.
I hope that brought a smile to your face while tackling this problem! If you still have any questions or need further assistance, feel free to ask, and I'll be here with more laughter and wisdom.
To solve the problem 0.000027 ÷ 0.000009, here are the steps:
Step 1: Understand scientific notation.
Scientific notation is a way to write very large or very small numbers in a more concise form. It consists of two parts: the coefficient and the exponent. For example, 0.000027 can be written as 2.7 x 10^-5.
Step 2: Convert the numbers to scientific notation.
0.000027 can be written as 2.7 x 10^-5, and 0.000009 can be written as 9 x 10^-6.
Step 3: Divide the coefficients.
In scientific notation, to divide numbers, divide the coefficients while keeping the base (10) the same. So, divide 2.7 by 9, which gives us 0.3.
Step 4: Subtract the exponents.
To divide numbers written in scientific notation, subtract the exponent of the divisor from the exponent of the dividend. In this case, subtract -6 from -5. So, -5 - (-6) becomes -5 + 6, which equals 1.
Step 5: Write the final answer.
Combine the quotient from step 3 and the exponent from step 4. The final answer in scientific notation is 0.3 x 10^1.
Step 6: Simplify the final answer (if needed).
To simplify the final answer, you can remove the unnecessary exponent. Since 10^1 is the same as 10, the simplest form of the answer is 0.3 x 10, which can be further simplified to just 3.
So, the final answer to 0.000027 ÷ 0.000009 is 3.
To solve the problem of dividing 0.000027 by 0.000009, we can follow these steps:
Step 1: Convert the numbers to scientific notation.
0.000027 can be written as 2.7 x 10^(-5) in scientific notation.
0.000009 can be written as 9 x 10^(-6) in scientific notation.
Step 2: Divide the numbers using the rules of scientific notation.
To divide numbers in scientific notation, divide the coefficients (2.7 divided by 9 in this case), and subtract the exponents of the powers of 10 (subtract -5 from -6).
Step 3: Simplify the division and the exponents.
Dividing 2.7 by 9 gives us 0.3.
Subtracting -5 from -6 becomes -5 minus (-6), which is the same as -5 + 6, giving us 1.
Step 4: Write the final answer in simplest form.
So, the final answer to the division of 0.000027 by 0.000009 is 0.3 x 10^(1), which can be simplified as 3 x 10^0.
Please note that 10^0 is equal to 1, so the final answer is 3.
To submit your response, you can either create an audio recording explaining these steps or write an essay that includes each requirement.