For each planet in a solar system, its year is the time it takes the planet to revolve around the center star. The formula Upper E=0.2 x^3/2 models the number of Earth days in a planet's year, E, where x is the average distance of the planet from the center star, in millions of kilometers. There are approximately 686.3 Earth days in the year of Planet Upper D. What is the average distance of Planet Upper D from the center star?

Question

contestada

Respuesta :

ACCESS MORE EDU ACCESS Universidad de Mexico

prosborough198p2ub41 prosborough198p2ub41 · Answer 1 · 2019-05-30T21:12:40+02:00

Answer: 227.5*10^6 km or 227.5 million km

Step-by-step explanation:

x^3/2*.02=686.3

686.3/.2=x^3/2*.2/.2

x^3/2=3431.5

x=227.50415642

Answer Link

Ashraf82 Ashraf82 · Answer 2 · 2019-06-11T10:17:20+02:00

Answer:

The average distance of Planet Upper D from the center star is 227.5 millions of kilometers (227.5 × 10^6 kilometers)

Step-by-step explanation:

* Lets explain information to solve the problem

- x is the average distance of the planet from the center star, in millions

of kilometers

- The formula of Earth days in the year of Planet is 0.2 x^(3/2)

- The Earth days in the year of Plant D is approximately 686.3

* Lets solve the problem

∵ The number of Earth days in a planet's year = 0.2 x^(3/2)

∵ The Earth days in the year of Plant D is approximately 686.3

- Lets substitute this value in the formula

∴ 686.3 = 0.2 x^(3/2) ⇒ divide both sides by 0.2

∴ 686.3/0.2 = 0.2/0.2 x^(3/2)

∴ 3431.5 = x^(3/2)

- We can use this rule to solve the equation

# If x^n = a, where a is a constant, then x = a^(1/n)

that means we reciprocal the power and take it to the other side

∴ x = (3431.5)^(2/3)

- Now use your calculator to find the answer

∴ x ≅ 227.5

* The average distance of Planet Upper D from the center star is

227.5 millions of kilometers (227.5 × 10^6 kilometers)