The Asteroid Belt is part of our Solar System. Vesta is an asteroid in the Asteroid Belt. (a) Vesta orbits the Sun between the orbits of A Venus and Earth B Earth and Mars C Mars and Jupiter D Jupiter and Saturn (b) Vesta has an orbital speed of 1.9 × 10⁶ m/s. Vesta travels a distance of 2.2 × 10⁹ m when it orbits the Sun once. Calculate the time taken for Vesta to orbit the Sun once. time = ________________ s (c) Explain why Vesta is accelerating even when it is travelling at a constant speed. (d) Energy is transferred from the Sun to Vesta by radiation. Explain why the temperature on Vesta does not continue to rise, even though it is absorbing energy from the Sun. (e) The distance between Vesta and the Sun is 2.4 AU. 1 AU is the distance between the Earth and the Sun. The intensity of the Sun’s radiation reaching the Earth is 1400 W/m². 1 W = 1/s The intensity of the Sun’s radiation at a distance, d, from the Sun is given by the equation intensity = K/(d²) where K always has the same value. (i) State the unit of K. (ii) Calculate the intensity of the radiation from the Sun at Vesta.

Photo AI

The Asteroid Belt is part of our Solar System - Edexcel - GCSE Physics - Question 8 - 2021 - Paper 1

Question 8

The Asteroid Belt is part of our Solar System. Vesta is an asteroid in the Asteroid Belt. (a) Vesta orbits the Sun between the orbits of A Venus and Earth B Eart... show full transcript

Worked Solution & Example Answer:The Asteroid Belt is part of our Solar System - Edexcel - GCSE Physics - Question 8 - 2021 - Paper 1

Step 1

Vesta has an orbital speed of 1.9 × 10⁶ m/s. Vesta travels a distance of 2.2 × 10⁹ m when it orbits the Sun once. Calculate the time taken for Vesta to orbit the Sun once.

96%

114 rated

Answer

To find the time taken for Vesta to orbit the Sun, we can use the formula for time:

ext{Time} = rac{ ext{Distance}}{ ext{Speed}}

Here, the distance Vesta travels is $2.2 × 10^9$ m and the speed is $1.9 × 10^6$ m/s.

Substituting these values:

ext{Time} = rac{2.2 × 10^9 ext{ m}}{1.9 × 10^6 ext{ m/s}} \\ = 1156.84 ext{ s} \\ ≈ 1157 ext{ s}

Thus, the time taken for Vesta to orbit the Sun once is approximately 1157 seconds.

Step 2

Explain why Vesta is accelerating even when it is travelling at a constant speed.

99%

104 rated

Answer

Vesta is accelerating because it is moving in a circular path around the Sun. In circular motion, even when the speed is constant, the direction of the velocity vector is continuously changing. This change in direction indicates that the object is experiencing centripetal acceleration, which is defined as acceleration that occurs toward the center of a circular path. Thus, while the speed may remain constant, the change in direction means Vesta is indeed accelerating.

Step 3

Explain why the temperature on Vesta does not continue to rise, even though it is absorbing energy from the Sun.

96%

101 rated

Answer

Vesta does not continue to rise in temperature because it radiates energy at the same rate that it absorbs it. When Vesta absorbs energy from the Sun, it also emits radiation back into space. At thermal equilibrium, the energy Vesta absorbs from the Sun equals the energy it radiates, resulting in a stable temperature. Therefore, even with constant absorption, the temperature remains consistent.

Step 4

State the unit of K.

98%

120 rated

Answer

The unit of K is Watts (W), which is equivalent to joules per second (J/s).

Step 5

Calculate the intensity of the radiation from the Sun at Vesta.

97%

117 rated

Answer

To calculate the intensity of radiation at Vesta, we can use the formula:

ext{Intensity} = rac{K}{d^2}

where $d = 2.4 ext{ AU}$ . Since 1 AU is the distance from the Earth to the Sun, we first need to evaluate K:

Assuming $K = 1 ext{ AU} imes 1400 ext{ W/m}^2$ , we convert AU into meters:

ext{1 AU} = 1.496 × 10^{11} ext{ m}

Thus,

K = (1.496 × 10^{11}) × 1400\ = 2.0944 × 10^{14} ext{ W/m}^2.

Now substituting our values:

ext{Intensity} = rac{2.0944 × 10^{14} ext{ W/m}^2}{(2.4)^2} \\ = rac{2.0944 × 10^{14}}{5.76} \\ ext{Intensity} ≈ 3.64 × 10^{13} ext{ W/m}^2.

Therefore, the intensity of the radiation from the Sun at Vesta is approximately $3.64 × 10^{13} ext{ W/m}^2$ .

The Asteroid Belt is part of our Solar System - Edexcel - GCSE Physics - Question 8 - 2021 - Paper 1

Worked Solution & Example Answer:The Asteroid Belt is part of our Solar System - Edexcel - GCSE Physics - Question 8 - 2021 - Paper 1

Vesta has an orbital speed of 1.9 × 10⁶ m/s. Vesta travels a distance of 2.2 × 10⁹ m when it orbits the Sun once. Calculate the time taken for Vesta to orbit the Sun once.

Explain why Vesta is accelerating even when it is travelling at a constant speed.

Explain why the temperature on Vesta does not continue to rise, even though it is absorbing energy from the Sun.

State the unit of K.

Calculate the intensity of the radiation from the Sun at Vesta.

Join the GCSE students using SimpleStudy...