Between which two points of concave mirror should an object be placed to obtain a magnification of:
(a) −3
(b) +25
(c) −0.4
(a) An object, in front of a concave mirror, should be placed between the latter's centre of curvature (C) and focus (F) to obtain a magnification of −3.
(b) An object, in front of a concave mirror, should be placed between the latter's focus (F) and the pole (P) to obtain a magnification of +25.
(c) An object, in front of a concave mirror, should be placed beyond the latter's centre of curvature (C) to obtain a magnification of −0.4.
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Between which two points of a concave mirror should an object be placed to obtain a magnification of -3 ?
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Between which two points of concave mirror should an object be placed to obtain a magnification of a 3 b + 2.5 c 0.4
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Between which two points of a concave mirror should an object be placed to obtain a magnification of 3 ?
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(a) To obtain a magnification of $-$3
An object should be placed in front of a concave mirror, between the centre of curvature $(C)$ and focus $(F)$ to obtain a magnification of $-$3.
Explanation
Given:
Magnification, $m$ = $-$3
Here, magnification is with the negative sign $(-)$, which implies that the image is real and inverted.
$\because m>1\Rightarrow $ the size of the image is greater than that of the object.
In the case of the concave mirror, both of the above-mentioned conditions are only possible when the object is placed between the centre of curvature $(C)$ and focus $(F)$ in front of the mirror.
(b) To obtain a magnification of $+$2.5
An object should be placed in front of a concave mirror, between the focus $(F)$ and the pole $(P)$ to obtain a magnification of +2.5.
Explanation
Given:
Magnification, $m$ = $+$2.5
Here, magnification is with the positive sign $(+)$, which implies that the image is virtual and erect.
$\because m>1\Rightarrow $ the size of the image is greater than that of the object.
In the case of the concave mirror, both of the above-mentioned conditions are only possible when the object is placed between the focus $(F)$ and the pole $(P)$ in front of the mirror.
(c) To obtain a magnification of $-$0.4
An object should be placed in front of a concave mirror, beyond the centre of curvature $(C)$ to obtain a magnification of $-$0.4.
Explanation
Given:
Magnification, $m$ = $-$0.4
Here, magnification is with the positive sign $(-)$, which implies that the image is real and inverted.
$\because m<1\rightarrow>
In the case of the concave mirror, both of the above-mentioned conditions are only possible when the object is placed beyond the centre of curvature $(C)$ in front of the mirror.