Compare 7.6 × 10^−25 and 6.7 × 10^−52 . Which statement is true?(1 point)
The statement "7.6 × 10^−25 is greater than 6.7 × 10^−52" is true.
To compare the numbers 7.6 × 10^−25 and 6.7 × 10^−52, we can simply compare the powers of 10. The magnitude of the power of 10 indicates the size of the number.
In this case, 10^-25 is a larger power of 10 compared to 10^-52. Therefore, 7.6 × 10^−25 is greater than 6.7 × 10^−52.
So the correct statement is: 7.6 × 10^−25 > 6.7 × 10^−52.
To compare the two numbers, 7.6 × 10^−25 and 6.7 × 10^−52 , we can start by comparing their exponents. The exponent represents the power of 10 in scientific notation.
In this case, the exponent for 7.6 × 10^−25 is -25, and the exponent for 6.7 × 10^−52 is -52. Since -52 is smaller than -25, we can conclude that 6.7 × 10^−52 is a smaller number.
Therefore, the correct statement would be:
7.6 × 10^−25 is greater than 6.7 × 10^−52.