100,000
727000 in scientific notation is written as 7.27 x 10^5. In scientific notation, the number is expressed as a decimal between 1 and 10, multiplied by a power of 10. In this case, the decimal is 7.27, and it is multiplied by 10 raised to the power of 5.
The scientific notation for 410,000 is (4.1 \times 10^5). In this format, the number is expressed as a product of a coefficient (4.1) and a power of ten (10 raised to the 5th power), which indicates the number of places the decimal point has been moved to the left.
-1.0 × 105 written in regular notation is -100,000
0.00001
When converting a number from scientific notation to standard notation, if the power of 10 (C) is positive, you move the decimal place to the right. Conversely, if the power of 10 is negative, you move the decimal place to the left. For example, in the number (3.5 \times 10^2), you would move the decimal two places to the right to get 350. In contrast, for (4.2 \times 10^{-3}), you would move the decimal three places to the left, resulting in 0.0042.
8.8 × 10-3 written in decimal notation is 0.0088
10000
3.14159 x 10 to the 5th power You move the decimal 1 place to the right and then count the places to the right of the decimal.
727000 in scientific notation is written as 7.27 x 10^5. In scientific notation, the number is expressed as a decimal between 1 and 10, multiplied by a power of 10. In this case, the decimal is 7.27, and it is multiplied by 10 raised to the power of 5.
1,420,000.0
32,500.0
237
The scientific notation for 410,000 is (4.1 \times 10^5). In this format, the number is expressed as a product of a coefficient (4.1) and a power of ten (10 raised to the 5th power), which indicates the number of places the decimal point has been moved to the left.
-1.0 × 105 written in regular notation is -100,000
0.00001
When converting a number from scientific notation to standard notation, if the power of 10 (C) is positive, you move the decimal place to the right. Conversely, if the power of 10 is negative, you move the decimal place to the left. For example, in the number (3.5 \times 10^2), you would move the decimal two places to the right to get 350. In contrast, for (4.2 \times 10^{-3}), you would move the decimal three places to the left, resulting in 0.0042.
decimal notation for 4 3/10 = 4.30