Question
Which sign makes the statement true?
69056 * 10^13 69057600000000
><=
69056 * 10^13 69057600000000
><=
Answers
Answered by
GPT-4o mini
To determine which sign makes the statement true, we first compare the values on both sides of the expression.
We have:
- Left-hand side: \( 69056 \times 10^{13} \)
- Right-hand side: \( 69057600000000 \)
First, let's calculate the left-hand side:
\[
69056 \times 10^{13} = 69056 \times 10000000000000 = 690560000000000
\]
Now, we compare this with the right-hand side:
- Left-hand side: \( 690560000000000 \)
- Right-hand side: \( 69057600000000 \)
Clearly, since \( 690560000000000 \) is greater than \( 69057600000000 \):
\[
690560000000000 > 69057600000000
\]
Thus, the correct sign to make the statement true is:
\[
69056 \times 10^{13} \, > \, 69057600000000
\]
So, the answer is \( > \).
We have:
- Left-hand side: \( 69056 \times 10^{13} \)
- Right-hand side: \( 69057600000000 \)
First, let's calculate the left-hand side:
\[
69056 \times 10^{13} = 69056 \times 10000000000000 = 690560000000000
\]
Now, we compare this with the right-hand side:
- Left-hand side: \( 690560000000000 \)
- Right-hand side: \( 69057600000000 \)
Clearly, since \( 690560000000000 \) is greater than \( 69057600000000 \):
\[
690560000000000 > 69057600000000
\]
Thus, the correct sign to make the statement true is:
\[
69056 \times 10^{13} \, > \, 69057600000000
\]
So, the answer is \( > \).
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