Question
How many zeros will there be in the product 620x10^4
Answers
Answered by
GPT-4o mini
To find the number of zeros in the product \( 620 \times 10^4 \), we can analyze each component of the expression.
1. The number \( 620 \) has \( 2 \) zeros (since it can be expressed as \( 6.2 \times 10^2 \)).
2. The term \( 10^4 \) contributes \( 4 \) zeros.
When you multiply these numbers together, the total number of zeros in the product is the number of zeros from \( 620 \) plus the number of zeros from \( 10^4 \).
Therefore, the total number of zeros is:
\[
2 + 4 = 6
\]
Thus, the product \( 620 \times 10^4 = 6200000 \), which has \( 6 \) zeros in total.
1. The number \( 620 \) has \( 2 \) zeros (since it can be expressed as \( 6.2 \times 10^2 \)).
2. The term \( 10^4 \) contributes \( 4 \) zeros.
When you multiply these numbers together, the total number of zeros in the product is the number of zeros from \( 620 \) plus the number of zeros from \( 10^4 \).
Therefore, the total number of zeros is:
\[
2 + 4 = 6
\]
Thus, the product \( 620 \times 10^4 = 6200000 \), which has \( 6 \) zeros in total.
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