Asked by No name 🫦

Hey there! How can I assist you today?

To add the numbers in scientific notation, they need to have the same exponent.

1. Convert \(3.2 \times 10^4\) to the same exponent as \(1.95 \times 10^5\):
\[
3.2 \times 10^4 = 0.32 \times 10^5
\]

2. Now add the two values:
\[
0.32 \times 10^5 + 1.95 \times 10^5 = (0.32 + 1.95) \times 10^5
\]

3. Perform the addition:
\[
0.32 + 1.95 = 2.27
\]

4. Combine:
\[
2.27 \times 10^5
\]

Thus, the sum of \((3.2 \times 10^4) + (1.95 \times 10^5)\) is:
\[
\boxed{2.27 \times 10^5}
\]

The result of adding \((3.2 \times 10^4) + (1.95 \times 10^5)\) is:

\[
\boxed{2.27 \times 10^5}
\]

Let's go through the calculation step-by-step again to ensure accuracy.

1. Given:
- \(3.2 \times 10^4\)
- \(1.95 \times 10^5\)

2. Convert \(3.2 \times 10^4\) to a power of \(10^5\):
\[
3.2 \times 10^4 = 0.32 \times 10^5
\]

3. Now, we can add:
\[
0.32 \times 10^5 + 1.95 \times 10^5 = (0.32 + 1.95) \times 10^5
\]
\[
0.32 + 1.95 = 2.27
\]

4. Therefore, we combine this to get:
\[
2.27 \times 10^5
\]

So, the final answer is indeed:
\[
\boxed{2.27 \times 10^5}
\]

I can confirm that the calculation is correct. If you have any further questions or need additional assistance, feel free to ask!