The populations of cities A and B are 2.6 * 10^5 and 1,560,000 respectively. the population of city C is twice the population of city Bthe population of city C is how many times the population of city A?
Answers
Answer:
City C is 12 times the population of city A.
Step-by-step explanation:
AI-generated answer
To find out how many times the population of city C is compared to city A, we first need to determine the population of city C.
Given that the population of city B is 1,560,000 and the population of city C is twice the population of city B, we can calculate the population of city C as follows:
Population of city C = 2 * Population of city B
= 2 * 1,560,000
= 3,120,000
Now that we know the population of city C is 3,120,000, we can compare it to the population of city A.
The population of city A is given as 2.6 * 10^5 (which is scientific notation for 2.6 multiplied by 10 raised to the power of 5).
To compare the population of city C to city A, we divide the population of city C by the population of city A:
Population of city C / Population of city A = 3,120,000 / 2.6 * 10^5
To simplify this calculation, we can express both numbers in the same format:
3,120,000 = 3.12 * 10^6 (since we move the decimal point 6 places to the right)
2.6 * 10^5 = 260,000 (as we move the decimal point 5 places to the right)
Now we can calculate:
Population of city C / Population of city A = 3.12 * 10^6 / 260,000
Dividing these two numbers, we get:
Population of city C / Population of city A = 12
Therefore, the population of city C is 12 times the population of city A.
Answer:
City C is 12 times the population of city A.
Step-by-step explanation:
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What is Volume?
Volume of a three dimensional shape is the space occupied by the shape.
Given a cube.
Volume of a cube = a³
Here a is the side length of a cube.
Here side length of the cube = 6 inches
Volume of the cube = 6³ = 216 inches³
Volume of a sphere = π r³
Here diameter of the sphere = 6 inches
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Volume of the region inside the cube but outside the sphere is,
Volume of cube - Volume of sphere
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102.903 inches³
Hence the volume of the region inside the cube but outside the sphere is, 102.903 inches³.
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The volume of the region outside the sphere but inside the cube can be found by subtracting the area of the sphere from the area inside the cube.
216 - 105.975 = 110.025
The volume of the region outside of the sphere but inside the cube is 110.025 in ³
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