0D%0A7%0D%0A%0D%0A2 × 106%0D%0A2%0D%0A %0D%0A×%0D%0A %0D%0A10%0D%0A6%0D%0A is 10 times as great as 2 × 105%0D%0A2%0D%0A %0D%0A×%0D%0A %0D%0A10%0D%0A5%0D%0A 2 × 106%0D%0A2%0D%0A %0D%0A×%0D%0A %0D%0A10%0D%0A6%0D%0A is 10 times as great as 2 × 105%0D%0A2%0D%0A %0D%0A×%0D%0A %0D%0A10%0D%0A5%0D%0A%0D%0A4 × 108%0D%0A4%0D%0A %0D%0A×%0D%0A %0D%0A10%0D%0A8%0D%0A is 100 times as great as 4 × 106%0D%0A4%0D%0A %0D%0A×%0D%0A %0D%0A10%0D%0A6%0D%0A4 × 108%0D%0A4%0D%0A %0D%0A×%0D%0A %0D%0A10%0D%0A8%0D%0A is 100 times as great as 4 × 106

It seems that you're presenting a sequence of statements regarding the relationships between different expressions in scientific notation. Let's clarify and analyze each part:

1. You mention that \(2 \times 10^6\) is 10 times as great as \(2 \times 10^5\).
- This statement is correct.
\[
2 \times 10^6 = 10 \times (2 \times 10^5)
\]

2. You then reiterate that \(2 \times 10^6\) is indeed 10 times as great as \(2 \times 10^5\).

3. Next, you present the expression \(4 \times 10^8\) and say that it is 100 times as great as \(4 \times 10^6\).
- This statement is also correct.
\[
4 \times 10^8 = 100 \times (4 \times 10^6)
\]

4. Finally, you reiterate that \(4 \times 10^8\) is 100 times as great as \(4 \times 10^6\).

In summary, both comparisons you provided are mathematically accurate:
- \(2 \times 10^6\) is 10 times \(2 \times 10^5\).
- \(4 \times 10^8\) is 100 times \(4 \times 10^6\).

If you need further clarification or have additional questions about these comparisons, feel free to ask!

answer

Certainly! Here’s a concise answer to your statements:

1. **Statement**: \(2 \times 10^6\) is 10 times as great as \(2 \times 10^5\).
- **True**: \(2 \times 10^6 = 10 \times (2 \times 10^5)\).

2. **Statement**: \(4 \times 10^8\) is 100 times as great as \(4 \times 10^6\).
- **True**: \(4 \times 10^8 = 100 \times (4 \times 10^6)\).

If you are looking for specific conclusions or applications of these relationships, please let me know!

whats the answer

It seems you might be looking for a straightforward summation of the comparisons rather than a detailed explanation. Here’s the succinct answer to your statements:

- **\(2 \times 10^6\) is 10 times \(2 \times 10^5\)**: This statement is **True**.

- **\(4 \times 10^8\) is 100 times \(4 \times 10^6\)**: This statement is **True**.

If you need a specific numerical answer or conclusion related to these comparisons, please clarify further!

whats not right

Let's carefully evaluate the statements you provided regarding the relationships between the expressions using scientific notation:

1. **Statement**: \(2 \times 10^6\) is 10 times as great as \(2 \times 10^5\).
- **Analysis**:
- \(2 \times 10^6 = 2 \times 10^5 \times 10^1\)
- This is **correct** because \(10^6\) is indeed 10 times greater than \(10^5\).

2. **Statement**: \(4 \times 10^8\) is 100 times as great as \(4 \times 10^6\).
- **Analysis**:
- \(4 \times 10^8 = 4 \times 10^6 \times 10^2\)
- This is **correct** because \(10^8\) is 100 times greater than \(10^6\).

Both statements are mathematically accurate.

### Confirmation
- **\(2 \times 10^6 = 10 \times (2 \times 10^5)\)**: True
- **\(4 \times 10^8 = 100 \times (4 \times 10^6)\)**: True

### Conclusion:
There is nothing mathematically incorrect about your expressions; both statements are indeed correct as presented. If you're looking for something specific that may be wrong or if there's a particular aspect of your question you're concerned about, please clarify!