To round the number 7,803,100 to the nearest place value, we look at the digit in the hundred thousands place, which is 3. Since 3 is less than 5, we round down the number, which means the nearest place value is the hundred thousands.
Expressing this number in the form of a single digit times an integer power of 10, we write it as 7.8 × 10⁶.
Therefore, a total of 7,803,100 tourists visited country A from the year 2018 to the year 2020 can be expressed as 7.8 × 10⁶.
a total of 7,803,100 tourists visited country A from the year 2018 to the year 2020. round to the nearest place value, then express this number in the form of a single digit time an integer power of 10.
5 answers
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To round the number 7,803,100 to the nearest place value, we look at the digit in the ones place, which is 0. Since 0 is less than 5, we round down the number, which means the nearest place value is the millions.
Expressing this number in the form of a single digit times an integer power of 10, we write it as 7 × 10⁶.
Therefore, a total of 7,803,100 tourists visited country A from the year 2018 to the year 2020 can be expressed as 7 × 10⁶.
To round the number 7,803,100 to the nearest place value, we look at the digit in the ones place, which is 0. Since 0 is less than 5, we round down the number, which means the nearest place value is the millions.
Expressing this number in the form of a single digit times an integer power of 10, we write it as 7 × 10⁶.
Therefore, a total of 7,803,100 tourists visited country A from the year 2018 to the year 2020 can be expressed as 7 × 10⁶.
Two weeks before an examination day, a librarian monitored the number of students who visited the library. Then they compared it with the number of visits made in an average week. Approximately 2×10^3
visits were reflected in their logbook during this two-week period, while only about 5×10^2
were reflected on an average week. How many times higher is the number of library visits before examination day compared to the library visits in an average week? Your answer should be a whole number.(1 point)
visits were reflected in their logbook during this two-week period, while only about 5×10^2
were reflected on an average week. How many times higher is the number of library visits before examination day compared to the library visits in an average week? Your answer should be a whole number.(1 point)
To find out how many times higher the number of library visits before the examination day is compared to the library visits in an average week, we need to divide the number of visits before the examination day by the number of visits in an average week.
Number of visits before examination day = 2 × 10^3
Number of visits in an average week = 5 × 10^2
Dividing the number of visits before examination day by the number of visits in an average week:
(2 × 10^3) / (5 × 10^2)
To simplify this division, we can divide the coefficients and subtract the exponents of the powers of 10:
(2 / 5) × 10^(3-2)
= (2 / 5) × 10^1
= 0.4 × 10^1
= 4 × 10^0
= 4
The number of library visits before the examination day is 4 times higher than the number of visits in an average week.
Therefore, the answer is 4.
Number of visits before examination day = 2 × 10^3
Number of visits in an average week = 5 × 10^2
Dividing the number of visits before examination day by the number of visits in an average week:
(2 × 10^3) / (5 × 10^2)
To simplify this division, we can divide the coefficients and subtract the exponents of the powers of 10:
(2 / 5) × 10^(3-2)
= (2 / 5) × 10^1
= 0.4 × 10^1
= 4 × 10^0
= 4
The number of library visits before the examination day is 4 times higher than the number of visits in an average week.
Therefore, the answer is 4.