75. A astronomical telescope has objective and eyepiece of focal lengths 40 cm and 4 cm respectively. To view an object 200 cm away from the objective, the lenses must be separated by a distance :
\(\dfrac{1}{f_o} = \dfrac{1}{v_o} - \dfrac{1}{u_o}\)
\(\dfrac{1}{+40} = \dfrac{1}{v_o} - \dfrac{1}{-200}\)
\(\dfrac{1}{v_o} = \dfrac{1}{40} - \dfrac{1}{200}\)
\(v_o = +\, 50 \, \text{cm}\)
\(L = 50 \, \text{cm} + 4 \, \text{cm} = 54 \, \text{cm}\)
Astronomical Telescope Numerical Problem (Object at Finite Distance)
Question
An astronomical telescope has an objective and eyepiece of focal lengths 40 cm and 4 cm respectively. To view an object 200 cm away from the objective, the lenses must be separated by a distance:
- (a) 37.3 cm
- (b) 46.0 cm
- (c) 50.0 cm
- (d) 54.0 cm
Answer: (d) 54.0 cm
Concept
For an astronomical telescope:
- If object is at infinity → \( L = f_o + f_e \)
- If object is at finite distance → image is not formed at focal plane
- We must calculate image distance \( v_o \) using lens formula
For final image at infinity (normal adjustment):
\( L = v_o + f_e \)
Step-by-Step Solution
Step 1: Lens Formula
\( \frac{1}{f_o} = \frac{1}{v_o} - \frac{1}{u_o} \)
Substitute values:
\( \frac{1}{40} = \frac{1}{v_o} - \frac{1}{-200} \)
\( \frac{1}{40} = \frac{1}{v_o} + \frac{1}{200} \)
\( \frac{1}{v_o} = \frac{1}{40} - \frac{1}{200} \)
\( \frac{1}{v_o} = \frac{5 - 1}{200} = \frac{4}{200} = \frac{1}{50} \)
\( v_o = 50 \text{ cm} \)
Step 2: Length of Telescope
\( L = v_o + f_e \)
\( L = 50 + 4 = 54 \text{ cm} \)
Final Answer: 54 cm
Key Takeaways
- For distant objects → \( L = f_o + f_e \)
- For nearby objects → use lens formula to find \( v_o \)
- Then apply \( L = v_o + f_e \)
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