Answer:
16.67 cm.
Explanation:
radius of curvature r = 50 cm
Focal length f = 25 cm
Magnification can be achieved 3 times in concave mirror in two ways .
1) By putting the object very close to the mirror ( within focal length ) so that magnified virtual and erect image is observed.
2) By putting the object between f and 2f so that real and inverted magnified image is observed .
In the question , the object distance in the former case has been asked.
\frac{v}{u}=3\\
v = 3u
Using the mirror formula we can calculate the required distance as follows
\frac{1}{v}+\frac{1}{u}=\frac{1}{f}
Put v = -3u, f = -25.
-\frac{1}{3u}+\frac{1}{u}=\frac{1}{-25}\\
u=16.67cm
The distance of the closer object 16.67 cm.
The magnification of the mirror is calculated as follows;
M = v/u
3 = v/u
v = 3u
The distance of the object in the converging mirror is calculated as follows;
1/f = 1/u + 1/v
where;
1/25 = 1/u + 1/3u
1/25 = 4/3u
3u = 25 x 4
3u = 100
u = 100/3
u = 33.33 cm
Distance of closer object = 50 cm - 33.33 cm = 16.67 cm
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