How many times less is 10 ^ 2 than 10 ^ 6 express your answer as an integer power of 10
To find out how many times less 10^2 is compared to 10^6, we need to divide 10^6 by 10^2.
10^6 / 10^2 = 10^(6-2) = 10^4
So, 10^2 is 10^4 times less than 10^6.
To find out how many times less 10^2 is than 10^6, we can divide 10^6 by 10^2. Dividing two 10's raised to different powers is equivalent to subtracting the exponents:
10^6 / 10^2 = 10^(6-2) = 10^4
Therefore, 10^2 is 10^4 times less than 10^6.
To determine how many times less 10^2 is than 10^6, we need to find the ratio of the two numbers.
Starting with 10^6 as the larger number, we divide it by 10^2:
10^6 / 10^2 = 10^(6-2) = 10^4
So, 10^2 is 10^4 times less than 10^6.
Expressing this as an integer power of 10, we can rewrite it as:
1 / 10^4 = 10^(-4)
Therefore, 10^2 is 10^(-4) times less than 10^6.