0.000027 ÷ 0.000009

Requirements:
• Explain how to use scientific notation to solve the problem.
• Describe how to divide numbers written in scientific notation.
I am re posting again because i need more help then what i got because i don't understand it

To solve the division problem 0.000027 ÷ 0.000009 using scientific notation, follow these steps:

Step 1: Express the numbers in scientific notation
Write both numbers in the form of "a × 10^b", where "a" is a decimal greater than or equal to 1 but less than 10, and "b" represents the power of 10.

0.000027 can be written as 2.7 × 10^(-5)
0.000009 can be written as 9 × 10^(-6)

Step 2: Divide the decimal parts
Divide the decimal parts of the numbers: 2.7 ÷ 9 = 0.3

Step 3: Subtract the exponents
Subtract the exponent of the divisor from the exponent of the dividend. In this case, (-5) - (-6) = (-5) + 6 = 1

Step 4: Express the quotient in scientific notation
Write the quotient (0.3) as a decimal greater than or equal to 1 but less than 10 and multiply it by 10 raised to the power of the result in Step 3.

Therefore, the final answer is 0.3 × 10^(1), which can be simplified as 3 × 10^(0) or simply 3.

So, 0.000027 ÷ 0.000009 = 3.

In summary:
0.000027 ÷ 0.000009 = 3
or
2.7 × 10^(-5) ÷ 9 × 10^(-6) = 3 × 10^(0)

2.7 * 10^-5 - 9 * 10^-6

27 * 10^-6 - 9 * 10^-6

18 * 10^-6

1.8 * 10^-5

.000018