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How many times greater are the boxed digits at the left than the boxed digits at the right?
To determine how many times greater the boxed digits on the left are than those on the right, you would divide the value of the left boxed digits by the value of the right boxed digits. For example, if the left boxed digit is 20 and the right boxed digit is 5, you would calculate 20 ÷ 5 = 4. Therefore, the left boxed digits are 4 times greater than the right boxed digits. Please provide the specific boxed digits for a precise calculation.
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How many times greater is the place value of a digit of a number than the place value of the next digits to its right?
In the decimal system, 10 times.
If a number with two digits is equal to four times the sum of its digits the number formed by reversing the order of the digits is 27 greater than the given number what is the number?
36
Is a number with two digits is equal to four times the sum of its digits the number formed by reversing the order ofthe digits is 27 greater than the given number what is the number?
The number is 36.
How many times greater is the place of the next digit too its right?
It is 'base' times greater, that is 10 times greater if you are looking at a decimal number. Two times greater if you are looking at a binary number. Etc etc
What is the place value relationship when the same two digits are next to each other in a multi digit number?
It is easy the left side as to be ten times greater then your right side for example my ones place is ten times greater my tens place is ten times greater than my hundreds place and my hundreds place is ten times greater than my thousands place i hope this will help you bye
How many times is greater is the encircled digit at the left than the encircled digit at the right?
There is a lack of circled digits!
How many times greater is the place value of a digit of a number than the place value of the next digits to its right?
In the decimal system, 10 times.
How many times greater is the place value of a digit of a number than the place value of the next digits to the right?
In the decimal place value system, each digit is ten times bigger than the digit on its right
How many times greater is the place value of a digits of a number than the place value of the next digit to its right?
In the decimal system, 10 times. In another system, where the base is x, it would be x times.
If a number with two digits is equal to four times the sum of its digits the number formed by reversing the order of the digits is 27 greater than the given number what is the number?
36
Is a number with two digits is equal to four times the sum of its digits the number formed by reversing the order ofthe digits is 27 greater than the given number what is the number?
The number is 36.
How many times greater is the digit in the hundreds place then the tenths for the number 0.11?
None, the digits are the same.
Is 345 greater than 3.45?
Yes, 345 is greater than 3.45. When comparing numbers, you can align the decimal points and compare the digits from left to right. In this case, 345 is in the hundreds place, while 3.45 is in the ones place. Therefore, 345 is greater than 3.45.
How many times greater is the place of the next digit too its right?
It is 'base' times greater, that is 10 times greater if you are looking at a decimal number. Two times greater if you are looking at a binary number. Etc etc
Four times the sum of the digits of a two-digit number is equal to the number if the digits are reversed the resulting number is 27 greater than the original number what is the number?
The number is 36
What is the place value relationship when the same two digits are next to each other in a multi digit number?
It is easy the left side as to be ten times greater then your right side for example my ones place is ten times greater my tens place is ten times greater than my hundreds place and my hundreds place is ten times greater than my thousands place i hope this will help you bye
What statements about the value of the digits in the number 6666666 are true?
"They're all sixes." Each six to the left is ten times greater than the one immediately to its right. Each six to the right is ten times less than the one immediately to its left.
