Asked by woosan♥

To multiply \(5.5 \times 10^4\) by \(2.2 \times 10^{-8}\), we can break it down as follows:

1. **Multiply the decimal parts**:
\[
5.5 \times 2.2 = 12.1
\]

2. **Add the exponents**:
\[
10^4 \times 10^{-8} = 10^{4 + (-8)} = 10^{-4}
\]

Combining both results, we get:
\[
12.1 \times 10^{-4}
\]

Now let's express this in proper scientific notation. In scientific notation, the coefficient (the number before the exponent) should be between 1 and 10, so we adjust \(12.1\) to \(1.21\) and increase the exponent by 1:

\[
12.1 \times 10^{-4} = 1.21 \times 10^{-3}
\]

Thus, the answer in scientific notation is:
\[
\boxed{1.21 \times 10^{-3}}
\]

When multiplying two numbers in scientific notation, you **multiply the coefficients** and **add the exponents** of the powers of 10.

So the correct response is:

**Multiply the coefficients and add the exponents of the powers of 10.**

To find the total area of the tape in square millimeters, we need to multiply the length of tape by its width:

Given:
- Length of tape: \(1.14 \times 10^4 \, \text{mm}\)
- Width of tape: \(12.7 \, \text{mm}\)

1. **Multiply the coefficients**:
\[
1.14 \times 12.7 = 14.478
\]

2. **Add the exponents**:
Since \(12.7\) can be expressed as \(1.27 \times 10^1\), we can do the multiplication with both coefficients and powers of 10:
\[
1.14 \times 10^4 \times 1.27 \times 10^1 = 14.478 \times 10^{(4+1)} = 14.478 \times 10^5
\]

3. To write this in standard scientific notation, we must adjust \(14.478\) to \(1.4478\) and increase the exponent by 1:
\[
14.478 \times 10^5 = 1.4478 \times 10^6
\]

However, it seems we want the total area as it was calculated before adjustment. Thus:

The product is thus:
\[
14.478 \times 10^5 \, \text{mm}^2
\]

Therefore, the correct response is:

**14.478×105 mm²**

To find the total volume of \(1.5 \times 10^6\) sugar cubes, each with a volume of \(4.9 \, \text{ml}\), we perform the following calculations:

1. **Multiply the coefficients**:
\[
1.5 \times 4.9 = 7.35
\]

2. **Add the exponents**:
Here, we can express \(4.9\) in scientific notation as \(4.9 \times 10^0\), so:
\[
1.5 \times 10^6 \times 4.9 \times 10^0 = 7.35 \times 10^{(6 + 0)} = 7.35 \times 10^6
\]

Thus, the total volume of the sugar cubes is:
\[
7.35 \times 10^6 \, \text{ml}
\]

The correct response is:

**7.35×106 ml**.

To multiply \(0.75\) by \(2.8 \times 10^{-5}\), we can follow these steps:

1. **Multiply the coefficients**:
\[
0.75 \times 2.8 = 2.1
\]

2. **Add the exponents**:
Since \(0.75\) can be expressed as \(0.75 \times 10^0\), the multiplication becomes:
\[
0.75 \times 2.8 \times 10^0 \times 10^{-5} = 2.1 \times 10^{(0 + (-5))} = 2.1 \times 10^{-5}
\]

Thus, the result of multiplying \(0.75\) by \(2.8 \times 10^{-5}\) is:
\[
2.1 \times 10^{-5}
\]

The correct response is:

**2.1×10−5**.