Question
How much greater is 2, point, 6, times, 10, to the power minus 42.6×10
−4
than 5, point, 9, times, 10, to the power minus 55.9×10
−5
? Express your answer using either standard notation
Answer
Attempt 1 out of 2
Standard Notation
Answer:
−4
than 5, point, 9, times, 10, to the power minus 55.9×10
−5
? Express your answer using either standard notation
Answer
Attempt 1 out of 2
Standard Notation
Answer:
Answers
Answer
How much greater is 2, point, 6, times, 10, to the power minus 42.6×10
−4
than 5, point, 9, times, 10, to the power minus 55.9×10
−5
? Express your answer using standard notation
Answer
Attempt 1 out of 2
Standard Notation
Answer:
−4
than 5, point, 9, times, 10, to the power minus 55.9×10
−5
? Express your answer using standard notation
Answer
Attempt 1 out of 2
Standard Notation
Answer:
Answer
How much greater is 2, point, 6, times, 10, to the power minus 42.6×10
−4
than 5, point, 9, times, 10, to the power minus 55.9×10
−5
? Express your answer using either standard notation
Answer
Attempt 1 out of 2
Use Standard notation
Standard Notation
Answer:
−4
than 5, point, 9, times, 10, to the power minus 55.9×10
−5
? Express your answer using either standard notation
Answer
Attempt 1 out of 2
Use Standard notation
Standard Notation
Answer:
Answer
How much greater is 2, point, 6, times, 10, to the power minus 42.6×10
−4
than 5, point, 9, times, 10, to the power minus 55.9×10
−5
? Express your answer using either standard notation or scientific notation.
Answer
Attempt 1 out of 2
Standard Notation
Answer:
Use standard Notation to answer
−4
than 5, point, 9, times, 10, to the power minus 55.9×10
−5
? Express your answer using either standard notation or scientific notation.
Answer
Attempt 1 out of 2
Standard Notation
Answer:
Use standard Notation to answer
Answer
How many times greater is 1, point, 3, 6, 5, times, 10, to the power 81.365×10
8
than 3, point, 5, times, 10, to the power 63.5×10
6
? Express your answer using standard notation
Use standard notation to answer
8
than 3, point, 5, times, 10, to the power 63.5×10
6
? Express your answer using standard notation
Use standard notation to answer
Answer
The size of a cell is typically found by capturing an image under a microscope then using software to measure its diameter. Two cells are measured using this method:
Cell D: 2, point, 4, 5, times, 10, to the power minus 32.45×10
−3
centimeters
Cell E: 5, point, 9, times, 10, to the power minus 45.9×10
−4
centimeters
What's the difference between the diameters of the two cells? Express your answer using standard notation
Answer
Attempt 1 out of 2
Standard Notation
Answer:
centimeters
Cell D: 2, point, 4, 5, times, 10, to the power minus 32.45×10
−3
centimeters
Cell E: 5, point, 9, times, 10, to the power minus 45.9×10
−4
centimeters
What's the difference between the diameters of the two cells? Express your answer using standard notation
Answer
Attempt 1 out of 2
Standard Notation
Answer:
centimeters
Answered by
GPT 3.5
To find the difference between these two numbers in standard notation, we can simply subtract the second number from the first number.
First number: 2.6 × 10^(-4)
Second number: 5.9 × 10^(-5)
Subtracting the second number from the first number:
(2.6 × 10^(-4)) - (5.9 × 10^(-5)) = 2.04 × 10^(-4)
Therefore, the difference in standard notation is 2.04 × 10^(-4).
First number: 2.6 × 10^(-4)
Second number: 5.9 × 10^(-5)
Subtracting the second number from the first number:
(2.6 × 10^(-4)) - (5.9 × 10^(-5)) = 2.04 × 10^(-4)
Therefore, the difference in standard notation is 2.04 × 10^(-4).
Answered by
GPT 3.5
To find the difference between these two numbers in standard notation, we can subtract the second number from the first number.
First number: 2.6 × 10^(-4)
Second number: 5.9 × 10^(-5)
To subtract these numbers, we need to have the same exponent for the powers of 10. Let's adjust the second number to have the same exponent as the first number:
5.9 × 10^(-5) = 0.59 × 10^(-4)
Now, we can subtract the adjusted second number from the first number:
(2.6 × 10^(-4)) - (0.59 × 10^(-4)) = 2.01 × 10^(-4)
Therefore, the difference in standard notation is 2.01 × 10^(-4).
First number: 2.6 × 10^(-4)
Second number: 5.9 × 10^(-5)
To subtract these numbers, we need to have the same exponent for the powers of 10. Let's adjust the second number to have the same exponent as the first number:
5.9 × 10^(-5) = 0.59 × 10^(-4)
Now, we can subtract the adjusted second number from the first number:
(2.6 × 10^(-4)) - (0.59 × 10^(-4)) = 2.01 × 10^(-4)
Therefore, the difference in standard notation is 2.01 × 10^(-4).
Answered by
GPT 3.5
To find the difference between the two numbers in standard notation, we need to subtract the second number from the first number.
First number: 2.6 × 10^(-4)
Second number: 5.9 × 10^(-5)
Subtracting the second number from the first number:
(2.6 × 10^(-4)) - (5.9 × 10^(-5)) = 2.6 × 10^(-4) - 0.59 × 10^(-4)
To combine the powers of 10, we need to have the same exponent. Since both numbers have the same base (10), subtract the coefficients and keep the exponent the same:
2.6 - 0.59 = 2.01
Therefore, the difference in standard notation is 2.01 × 10^(-4).
First number: 2.6 × 10^(-4)
Second number: 5.9 × 10^(-5)
Subtracting the second number from the first number:
(2.6 × 10^(-4)) - (5.9 × 10^(-5)) = 2.6 × 10^(-4) - 0.59 × 10^(-4)
To combine the powers of 10, we need to have the same exponent. Since both numbers have the same base (10), subtract the coefficients and keep the exponent the same:
2.6 - 0.59 = 2.01
Therefore, the difference in standard notation is 2.01 × 10^(-4).
Answered by
GPT 3.5
To find the difference between the two numbers in standard notation, we need to subtract the second number from the first number.
First number: 2.6 × 10^(-4)
Second number: 5.9 × 10^(-5)
Converting both numbers to standard notation:
First number: 0.00026
Second number: 0.000059
Subtracting the second number from the first number:
0.00026 - 0.000059 = 0.000201
Therefore, the difference in standard notation is 0.000201.
First number: 2.6 × 10^(-4)
Second number: 5.9 × 10^(-5)
Converting both numbers to standard notation:
First number: 0.00026
Second number: 0.000059
Subtracting the second number from the first number:
0.00026 - 0.000059 = 0.000201
Therefore, the difference in standard notation is 0.000201.
Answered by
GPT 3.5
To find the ratio between the two numbers, we need to divide the first number by the second number.
First number: 1.365 × 10^(8)
Second number: 3.5 × 10^(6)
Converting both numbers to standard notation:
First number: 1.365 * 10^(8) = 136,500,000
Second number: 3.5 * 10^(6) = 3,500,000
Dividing the first number by the second number:
136,500,000 / 3,500,000 = 39
Therefore, the first number is 39 times greater than the second number in standard notation.
First number: 1.365 × 10^(8)
Second number: 3.5 × 10^(6)
Converting both numbers to standard notation:
First number: 1.365 * 10^(8) = 136,500,000
Second number: 3.5 * 10^(6) = 3,500,000
Dividing the first number by the second number:
136,500,000 / 3,500,000 = 39
Therefore, the first number is 39 times greater than the second number in standard notation.
Answered by
GPT 3.5
To find the difference between the diameters of the two cells in standard notation, we need to subtract the diameter of Cell E from the diameter of Cell D.
Diameter of Cell D: 2.45 × 10^(-3) centimeters
Diameter of Cell E: 5.9 × 10^(-4) centimeters
Subtracting the diameter of Cell E from the diameter of Cell D:
(2.45 × 10^(-3)) - (5.9 × 10^(-4)) = 2.45 × 10^(-3) - 0.59 × 10^(-3)
To combine the powers of 10, we need to have the same exponent. Since both numbers have the same base (10), subtract the coefficients and keep the exponent the same:
2.45 - 0.59 = 1.86
Therefore, the difference in standard notation is 1.86 × 10^(-3) centimeters.
Diameter of Cell D: 2.45 × 10^(-3) centimeters
Diameter of Cell E: 5.9 × 10^(-4) centimeters
Subtracting the diameter of Cell E from the diameter of Cell D:
(2.45 × 10^(-3)) - (5.9 × 10^(-4)) = 2.45 × 10^(-3) - 0.59 × 10^(-3)
To combine the powers of 10, we need to have the same exponent. Since both numbers have the same base (10), subtract the coefficients and keep the exponent the same:
2.45 - 0.59 = 1.86
Therefore, the difference in standard notation is 1.86 × 10^(-3) centimeters.
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