To solve this problem, we can set up a system of equations based on the given information. Let's denote the number as ABCD, where A is the thousands digit, B is the hundreds digit, C is the tens digit, and D is the ones digit. From the information provided, we have the following equations: B = 2, C = 3D, A = B + 2. By substituting the values of B and C into the equations, we can determine the number. The number is 2184.
It is the thousands place.
The place value that is ten times greater than the hundreds place is the thousands place. In the decimal numbering system, each place value is 10 times greater than the one to its right. Therefore, the hundreds place is followed by the thousands place, which represents a value that is 10 times greater than the hundreds place.
5000 is ten times greater than 500.
there are hundred hundred's in ten thousand.
20 times 100 = 2000
9342
hundreds
It is the thousands place.
this question doesnt make sense
Oh, dude, it's like super simple. The digit in the thousands place is 10 times greater than the same digit in the hundreds place. So, if you have a 3 in the thousands place, it's like 30 times greater than the 3 in the hundreds place. Math, man, it's wild.
The place value that is ten times greater than the hundreds place is the thousands place. In the decimal numbering system, each place value is 10 times greater than the one to its right. Therefore, the hundreds place is followed by the thousands place, which represents a value that is 10 times greater than the hundreds place.
1.382 OR 0.000 or 2831
47184
5000 is ten times greater than 500.
Yes, thousands or hundreds of thousands of times more.
A thousand.
To determine how many times greater the digit in the ten thousands place is than the digit in the hundreds place, we need to understand the positional value of each digit. The positional value of a digit increases by a factor of 10 as you move from right to left in a number. Therefore, the digit in the ten thousands place is 10 times greater than the digit in the hundreds place.