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Sagot :
Answer:
A) s' = 18.85 cm
B) Height is 0.739 mm
C) the image is inverted.
Explanation:
We are given;
Diameter; D = 9 cm
Radius; R = d/2 = 9/2 = 4.5 cm = 0.045 m
Refractive Index of glass; n₂= 1.55
Height of object; y = 1.52 mm = 0.00152 m
Object distance s = 25 cm = 0.25 m
Now, Refractive index of air is 1 from online values.
Thus; n_1 = 1
A) To find the position of the image of the arrow formed by paraxial rays incident on the convex surface which is denoted by s', we will use the formula;
((n_1)/s) + n₂/s' = (n₂ - n_1)/R
Plugging in the relevant values, we have;
(1/0.25) + 1.55/s' = (1.55 - 1)/0.045
(1/0.25) + 1.55/s' = 12.222
1.55/s' = 12.222 - (1/0.25)
1.55/s' = 12.222 - 4
1.55/s' = 8.222
s' = 1.55/8.222
s' = 0.1885 m
s' = 18.85 cm
B) We will use the magnification formula to calculate the height of the image formed by paraxial rays incident on the convex surface denoted by y';
m = y'/y = -n_1•s'/n_2•s
Thus;
y' = -(y × n_1 × s')/(n_2•s)
y' = -(0.1885 × 1 × 0.00152)/(1.55 × 0.25)
y' = -0.739 mm
Height is 0.739 mm inverted.
C) Since the height of y' is negative, then it means the image is inverted.
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