Compare 7.6 x 10^-25 and 6.7 x 10^-52 whitch statement is true?

Question

Create a visually appealing educational diagram illustrating the comparison between two extremely small scientific numbers, specifically 7.6 x 10^-25 and 6.7 x 10^-52. The diagram should include a number line or scale highlighting these two values, but the representation itself should clearly show the vast differences in magnitude between these two numbers. There should be a distinct symbol, like a star or a dot, representing each number. Everything should be drawn against a clean and uncluttered background. Be sure to maintain neutrality with respect to the question posed and not suggest any particular answer.

Compare 7.6 x 10^-25 and 6.7 x 10^-52 whitch statement is true?

Answer 1

The comparison between 7.6 x 10^-25 and 6.7 x 10^-52 can be determined by comparing the exponent values. In this case, 10^-25 is a larger exponent than 10^-52. Therefore, 7.6 x 10^-25 is a larger number than 6.7 x 10^-52.

Answer 2

To compare the numbers 7.6 x 10^-25 and 6.7 x 10^-52, we need to look at their exponents first.

In scientific notation, the exponent indicates the magnitude of the number. The higher the exponent, the smaller the number.

In this case, 10^-52 has a smaller exponent than 10^-25.

Therefore, 6.7 x 10^-52 is a smaller number than 7.6 x 10^-25.

So, the statement "6.7 x 10^-52 is smaller than 7.6 x 10^-25" is true.

Answer 3

To compare 7.6 x 10^-25 and 6.7 x 10^-52, we need to compare the exponents first. The exponent represents the magnitude of the number. In this case, -25 and -52.

Since -52 is a smaller value than -25, it means that 6.7 x 10^-52 is a smaller number compared to 7.6 x 10^-25. Therefore, the statement that is true is:

"6.7 x 10^-52 is a smaller number than 7.6 x 10^-25."