Question 18M.3.SL.TZ2.4

0.60c

OR

1.8 × 10⁸ «m s^–1»

 

[1 mark]

ALTERNATIVE 1

time interval in the Earth frame = 90 × γ = 112.5 minutes

«in Earth frame it takes 112.5 minutes for ship to reach station»

so distance = 112.5 × 60 × 0.60c

1.2 × 10m¹² «m»

 

ALTERNATIVE 2

Distance travelled according in the spaceship frame = 90 × 60 × 0.6c

= 9.72 × 10¹¹ «m»

Distance in the Earth frame «= 9.72 × 10¹¹ × 1.25» = 1.2 × 10¹² «m»

 

[3 marks]

signal will take «112.5 × 0.60 =» 67.5 «minutes» to reach Earth «as it travels at c»

OR

signal will take «$\frac{1.2\times {10}^{12}}{3\times {10}^8}$ =» 4000 «s»

 

total time «= 67.5 + 112.5» = 180 minutes or 3.00 h or 3:00am

 

[2 marks]

line from event E to A, upward and to left with A on ct axis (approx correct)

line from event A to B, upward and to right with B on ct' axis (approx correct)

both lines drawn with ruler at 45 (judge by eye)

 

eg:

[3 marks]

ALTERNATIVE 1

«In spaceship frame»

Finds the ratio $\frac{OB}{OE}$ (or by similar triangles on x or ct axes), value is approximately 4

hence time elapsed ≈ 4 × 90 mins ≈ 6h «so clock time is ≈ 6:00»

 

Alternative 1:

Allow similar triangles using x-axis or ct-axis, such as $\frac{distance2}{distance1}$ from diagrams below

 

ALTERNATIVE 2

«In Earth frame»

Finds the ratio

$\frac{ct\text{ coordinate of B}}{ct\text{ coordinate of A}}$, value is approximately 2.5

hence time elapsed ≈ $\frac{2.5\times 3\text{h}}{1.25}$ ≈ 6h

«so clocktime is ≈ 6:00»

 

 

ALTERNATIVE 2:

 

 

[2 marks]