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3 years ago

4,500,000,000 is how many times the value of 150,000,000

Mathematics

2 answers:

MatroZZZ [7]3 years ago

6 0

Answer:

pretty sure its 3...I think

liubo4ka [24]3 years ago

6 0

It is 30. 4,500,000,000 / 150,000,000 is equal to 30

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What is the volume of this triangular prism?

Liula [17]

Answer:

5676.16 cm^3

Step-by-step explanation:

The volume of any prism is given by the formula ...

V = Bh

where B is the area of one of the parallel bases and h is the perpendicular distance between them. Here, the base is a triangle, so its area will be ...

B = 1/2·bh

where the b and h in this formula are the base and height of the triangle, 28 cm and 22.4 cm.

Then the volume is ...

V = (1/2·(28 cm)(22.4 cm))·(18.1 cm) = 5676.16 cm^3

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You will note that this is half the product of the three dimensions, so is half the volume of a cuboid with those dimensions. Perhaps you can see that if you took another such prism and placed the faces having the largest area against each other, you would have a cuboid of the dimensions shown.

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3 years ago

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An elevator ascends,or goes up,at a rate of 750 feet per minute.is the height to which the elevator ascend proportional to the n

Sliva [168]

C=480
solve

480=24n+35
minus 35 both sides
445=24n
divide both sides by 24
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<span>so about 18 cakes</span>

7 0

3 years ago

The table gives estimates of the world population, in millions, from 1750 to 2000. year population year population 1750 790 1900

Tems11 [23]

The poopulation exponential model is given by

$P(t)=P_0e^{kt}$

Where, P(t) is the population after year t; Po is the initial population, t is the number of years from the starting year; k is the groth constant.

Given that the population in 1750 is 790 and the population in 1800 is 970, we obtain the population exponential equation as follows:

$970=790e^{50k} \\ \\ \Rightarrow e^{50k}=1.228 \\ \\ \Rightarrow 50k=\ln{1.228}=0.2053 \\ \\ \Rightarrow k=0.0041$

Thus, the exponential equation using the 1750 and the 1800 population values is $P(t)=790e^{0.0041t}$

The population of 1900 using the 1750 and the 1800 population values is given by

$P(t)=790e^{0.041\times150} \\ \\ =790e^{0.6158}=790(1.8511) \\ \\ =1,462$

The population of 1950 using the 1750 and the 1800 population values is given by

$P(t)=790e^{0.041\times200} \\ \\ =790e^{0.821}=790(2.2729) \\ \\ =1,796$

From the table, it can be seen that the actual figure is greater than the exponential model values.

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3 years ago

3(h + 5) + h + 2<br> Thanks to everyone have a great day ❤️

Harrizon [31]

Answer:

4h+17

Step-by-step explanation:

Hey There!

So to solve this problem we need to use distributive property

So we need to distribute the 3 to everything that is in the parenthesis ( h and 5)

3xh=3h

3x5=15

so now we have

3h +15 + h + 2

now we just combine like terms

3h+h=4h

15+2=17

So the answer is 4h+17

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2 years ago

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A six-sided die with sides labeled 1 through 6 will be rolled once. Each number is equally likely to be rolled. What is the prob

Sonja [21]

There are six sides on a dice.

If it is going to roll greater than 2, then it will be either a 3, 4, 5, or 6.

This is four out of the six sides.

Therefore the fraction is 4/6.

It can be reduced to 2/3.

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3 years ago

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