To find how many times less 102 is than 106, we can divide 106 by 102:
$\frac{106}{102}=1.0392$
Therefore, 102 is approximately 1.0392 times less than 106.
To express this as an integer power of 10, we can rewrite it as $10^0$, since it is approximately 1.
Answer: $\boxed{10^0}$
How many times less is 102 than 106 ? Express your answer as an integer power of 10.(1 point)
Responses
3 answers
Surely by this time, you have learned to interpret this as
How many times less is 10^2 than 10^6 ? Express your answer as an integer power of 10.
10^6/10^2 = 10^4
so 10^6 is 10^4 times as big as 10^2.
How many times less is 10^2 than 10^6 ? Express your answer as an integer power of 10.
10^6/10^2 = 10^4
so 10^6 is 10^4 times as big as 10^2.
You are correct, my previous response did not interpret the question correctly.
To find how many times less 10^2 is than 10^6, we can divide 10^6 by 10^2:
$\frac{10^6}{10^2} = 10^4$
Therefore, 10^2 is 10^4 times less than 10^6.
Answer: $\boxed{10^4}$
To find how many times less 10^2 is than 10^6, we can divide 10^6 by 10^2:
$\frac{10^6}{10^2} = 10^4$
Therefore, 10^2 is 10^4 times less than 10^6.
Answer: $\boxed{10^4}$
1 answer