The right 7 represent 10 times the value of the left 7 of 43.77
The statement suggests that the digit in the rightmost position, which is 7, is worth 10 times the digit in the leftmost position. Since the number is 43.77, the leftmost 7 has a value of 7. Therefore, the rightmost 7 would have a value of 10 times that, which is 70.
To find the value of the right 7 in the number 43.77, we need to understand that the decimal point separates the whole number from the fractional part.
To begin, let's break down the number:
- The left 7 is the digit before the decimal point.
- The right 7 is the digit after the decimal point.
In this case, we are told that the right 7 represents 10 times the value of the left 7. So, we need to determine the value of the left 7 and then multiply it by 10 to find the value of the right 7.
The left 7 in 43.77 is in the tens place, which has a value of 7 multiplied by 10, resulting in 70.
Therefore, the right 7 in 43.77 represents 10 times the value of the left 7, making it equal to 10 times 70, which is 700.