## How do you write 0.00057 in scientific notation?

What is 0.00057 in scientific notation? **5.7×10⁻⁴** or, equivalently, 5.7e-4.

**How do you write 0.0017 in scientific notation?**

**1 Answer**

- Move the decimal place to the right to create a new number between 1 and 10. Moving the decimal place. This gives N=1.7 .
- Count the number of times you moved the decimal. You moved the decimal 3 places to the right. That means the exponent a=-3 .
- Write the number in scientific notation. 0.0017=1.7×10-3.

**What is 0.00357 in standard form?**

To convert 0.00357 into standard form, the decimal point is moved 3 spaces to the right (or 3 digits jump left over the decimal point) to give 3.57 (so the only integer before the decimal point is a number between 1 and 9), and the 10^{-}^{3} shows how far and in which direction the decimal point moved (or the numbers jumped ...

**How do you write 0.0061 in scientific notation?**

Example: 0.0061 = **6.1 × 10** Write 0.0061 in scientific notation. We should move the decimal point 3 places to the right. So, the exponent will be -3. Example: 0.0061 = 6.1 × 10 Write 0.0061 in scientific notation.

**How do you write .0045 in scientific notation?**

To write 0,0045 in scientific notation, we will have to move the decimal point three point to right, which literally means multiplying by 1000=103 . Hence in scientific notation 0.0045=**4.5×10−3** (note that as we have moved decimal three point to right we are multiplying by 10−3 .

**What is the number 0.00567 expressed in scientific notation?**

Fortunately, scientific notation allows us to write such large or small numbers easily as multiples of 10. For example: 567000 can be written as 5.67 × 10. 0.00567 can be written as **5.67 × 10**.

**What is .0005 in scientific notation?**

0 . 005 = **5 × 10 - 3**.

**What is 0.00056 in standard form?**

The standard form is given as, 0.00056=**5.6×10−4**. **Q**.

**How do you write 0.00075 in standard form?**

Answer: To convert 0.00075 to scientific notation: Step 1) 0.00075 Y 7.5 The decimal place is moved so that we get 7.5. = 10-4, so the answer is **7.5 × 10-4**.

**How do you write 0.0047 in standard form?**

0.0047 written in scientific notation is **4.7 × 10 ^{–}^{3}**. Simply place the decimal point to get a number between 1 and 10 and then count the digits from the original decimal point to the new one. 274.3 written in scientific notation is 2.743 × 10

^{2}.

## What is 0.0027 in scientific notation?

Another example is **2.7 * 10^-3**, which is the number 0.0027 written in scientific notation.

**What is .00085 in scientific notation?**

Hence, we can write the scientific notation of 0.00085 as **8.5 × 10 − 4** .

**How do you write 0.00078 in scientific notation?**

Hence, we can say that the number \[0.000078\] expressed in scientific notation is **\[7.8\times {{10}^{-5}}\]**. Note: Students should not make any calculation mistakes.

**How do you write 0.00065 in scientific notation?**

Thus, **$6.5 \times {10^{ - 4}}$** is the scientific notation form of \[0.00065\] number. Note:While solving this type of problem, one important thing to keep in mind is the direction in which we move the decimal.

**How do you write 0.0023 in scientific notation?**

So, 0.0023 = **2.3 × 10−3**.

**What is 0.00045 in scientific notation?**

To write 0.00045 in scientific notation, write **4.5 x 10-4** The expression “4.5 x 10-4” is saying, “write 4.5 and move the decimal place four places to the left giving 0.00045.” Or you can think of it as saying 4.5 / 104 or 4.5 / 10000.

**What is 0.000125 in scientific notation?**

Standard Form - Decimal Numbers (0.000125). Scientific - Scientific Notation (**1.25e-4**).

**What is 0.000052 in scientific notation?**

Putting these ideas together, we see that the number 0.000052 written in scientific notation is **5.2 × 10 − 5** .

**What is 0.00125 in scientific notation?**

\[0.00125 = **1.25 \times {10^{ - 3}}\]** in scientific notation. Therefore the solution for the expression is \[0.00125 = 1.25 \times {10^{ - 3}}\]. Note: Scientific notation does is it shifts your numbers. So the first non zero digit is a whole number and the rest are expressed as decimals.

**What is 0.0087 in scientific notation?**

0.0087 = **8.7 × 10-3** We should move the decimal point 3 places to the right. So, the exponent will be -3.

## What is 0.000009 in scientific notation?

Thus, **$9 \times {10^{ - 6}}$** is the scientific notation form of \[0.000009\] number.

**How do you write .0000001 in scientific notation?**

**So we need to include (without applying it) a correction so that the actual overall value becomes the same.**

- So we have 1.0109=0.000000001.
- But another way of writing 1109 is 10−9 so we end up with the form:
- 1.0×1109=1.0×10−9.

**What is .0000008 in scientific notation?**

0.0000008 in scientific notation is **8 × 10 − 7** .

There is an easy rule to converting decimals to scientific notation form.

**What is 0.00052 in standard form?**

Answer. Answer: 0.00052 in standard form is **5.2 * 10^4**.

**How do you write .000000564 in standard form?**

⇒**5.** **64×10−7** [standard form] Was this answer helpful?

**How do you write 0.0000007 in standard form?**

Expert-Verified Answer

The standard form of 0.000007 will be 7 × 10^-6.

**What is 0.0000075 in scientific notation?**

Answer: the decimal number 0.0000075 written in scientific notation is **7.5 × 10-6** and it has 2 significant figures.

**How do you write 0.00000000837 in standard form?**

So, the standard form of 0.00000000837 is **8.37×10−9**.

**What is 0.00015 in standard form?**

Therefore, the standard form of the decimal number 0.00015 is **1.** **5×10-4**.

**How do you write 0.009 in standard form?**

In this case that would be 9 , and we have to move the decimal to the left 3 times to get 0.009 . So our final answer is **9⋅10−3** .

## How do you write 0.0089 in standard form?

The given measurement is 0.0089 L. This measurement involves two zero's after the decimal. The measurement can also be written using scientific notation as **8.9 × 10 − 3** by placing the two digits with the power of 10 as -3. Hence the correct notation can be 8.9 × 10 − 3 .

**How do you write 0.0001 in scientific notation?**

Answer: The scientific notation for 0.0001 is **1 × 10 ^{-}^{4}**.

**How do you write 0.0012 in scientific notation?**

The scientific notation form of 0.0012 is **1.2 × 10 − 3** .

**How do you write .0003 in scientific notation?**

The given number is 0.0003. The decimal is shifted to the right side to get a meaningful full number such as 3.0. The shifted number of decimal places is written as the raised to the power of 10 and moved to the right side which means it is taken as negative. Thus, the scientific notation is **3.0 × 10 − 4** .

**What is 0.0018 in scientific notation?**

0.0018 = 1.8 1000 = 1.8 × 1 1000 = **1.8 × 10−3**. This alternative form is called scientific notation and is based on the fact that moving the decimal point to the left or right in a number is equivalent to multiplying the number by a power of 10 (negative powers amount to dividing).

**What is .0004 in scientific notation?**

In. scientific notation 0.0004 is written as **4.0 x 10 ^{-}^{4}**. 5. For each power of 10, we move the decimal point one place to the left.

**What is .009 in scientific notation?**

In this case that would be 9 , and we have to move the decimal to the left 3 times to get 0.009 . So our final answer is **9⋅10−3** .

**How do you write 0.0259 in scientific notation?**

**Express each number in scientific notation.**

- 1) 0.0259. = ...
- 6,224 = 6.224 × 10. We should move the decimal point 3 places to. ...
- Write 6,224 in scientific notation. 0.0087 = 8.7 × 10 We should move the decimal point 3 places to the right. ...
- 1) 0.0259. = ...
- 2.59 × 10ˉ ...
- 9.02 × 10. ...
- 6,224 = 6.224 × 10. ...
- Write 6,224 in scientific notation.

**How do you write 0.0000987 in scientific notation?**

∴ The standard form of 0.0000987 is **9.87×10−5**.

**How do you write 0.000009 in scientific notation?**

Thus, **$9 \times {10^{ - 6}}$** is the scientific notation form of \[0.000009\] number. Note:While solving this type of problem, one important thing to keep in mind is the direction in which we move the decimal. If we move the decimal in the right direction, the exponent value will be negative.

## What is 0.07 as a scientific notation?

The number 0.07 can be written as **7 × 10 − 2** which means 7 × 1 100 .

**What is 0.0078 in scientific notation?**

10000 = 1 x 10^{4} | 24327 = 2.4327 x 10^{4} |
---|---|

1 = 10^{0} | |

1/10 = 0.1 = 1 x 10^{-}^{1} | 0.32 = 3.2 x 10^{-}^{1} (not usually done) |

1/100 = 0.01 = 1 x 10^{-}^{2} | 0.053 = 5.3 x 10^{-}^{2} |

1/1000 = 0.001 = 1 x 10^{-}^{3} | 0.0078 = 7.8 x 10^{-}^{3} |

**What is .0025 in scientific notation?**

This way 00.0025 can be written as **2.5×10−3** .