Mirror formula is the relationship between object
distance (u), image distance (v) and focal length.
1/v + 1/u = 1/f
In D ABC and D A’B’C
D ABC ~ D A’B’C [AA
similarity]
AB /A’B’ = AC/A’C ----(I)
Similarly,
In DABC and D A’B’C
D ABC ~ DA’B’C [AA
similarity]
AB /A’B’ = AC/A’C ----(1)
Similarly, In D FPE ~ D A’B’F
EP /A’B’ = PF/A’F
AB /A’B’ = PF/A’F [ AB=EP]
----(II)
From (i) &(ii)
AC/A’C =
PF/A’F
=> A’C/AC =
A’F/PF
=> (CP-A’P)/(AP-
CP) = (A’P – PF)/PF
Now, PF = - f ;
CP = 2PF = -2f ; AP = -u ; and A’P = -v
Put these value in above relation:
[(-2f) –(-v)] /(-u)-(-2f) = {(-v) –(-f) }/(-f)
=> uv = fv
+uf
=> 1/f =
1/u + 1/v
Let AB is an object placed between f1 and f2 of the convex lens. The image A1B1 is formed beyond 2F2 and is real and inverted.
OA = Object distance = u ; OA1 =
Image distance = v ; OF2 =
Focal length = f
In D OAB and D OA1B1
A1B1 /AB = OA1/OA -------------------(i)
Similarly, D OCF2 ~ D F2A1B1
A1B1 /OC
= F2A1/OF2
But we know that OC = AB
=> A1B1 /AB = F2A1/OF2 -------------------(ii)
From equation (i) and (ii), we get
OA1/OA = F2A1/OF2
OA1/OA = (OA1 - OF2)/OF2
v/-u = (v-u)/f
vf = -u(v-f)
vf = -uv + uf
Dividing equation (3) throughout by uvf
1/v - 1/u = 1/f
10th Light
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