a color slide is located 3 meters from a screen. how far from the slide must a lens of 2.5- cm focal length be placed to form a focused image on the screen? how much will the slide be magnified?
The lens must be placed 2.47 m from the slide (and thus 0.53 m from the screen), and the slide’s image will be magnified by a factor of about 8.9.
Given data and setup
- Distance between slide and screen: L=3 m=300 cmL=3,\text{m}=300,\text{cm}L=3m=300cm.
- Focal length of the lens: f=2.5 cmf=2.5,\text{cm}f=2.5cm (a convex lens used as a projector).
- Let:
- uuu = distance from slide (object) to lens
- vvv = distance from lens to screen (image)
They must satisfy:
- u+v=300 cmu+v=300,\text{cm}u+v=300cm
- Thin lens formula 1f=1u+1v\frac{1}{f}=\frac{1}{u}+\frac{1}{v}f1=u1+v1.
Step 1: Use the lens equation
Substitute v=300−uv=300-uv=300−u into the lens formula:
1f=1u+1300−u\frac{1}{f}=\frac{1}{u}+\frac{1}{300-u}f1=u1+300−u1
12.5=1u+1300−u\frac{1}{2.5}=\frac{1}{u}+\frac{1}{300-u}2.51=u1+300−u1
Compute the left side:
12.5=0.4 cm−1\frac{1}{2.5}=0.4,\text{cm}^{-1}2.51=0.4cm−1
So:
0.4=1u+1300−u0.4=\frac{1}{u}+\frac{1}{300-u}0.4=u1+300−u1
Combine the fractions:
1u+1300−u=300u(300−u)\frac{1}{u}+\frac{1}{300-u}=\frac{300}{u(300-u)}u1+300−u1=u(300−u)300
Thus:
0.4=300u(300−u)0.4=\frac{300}{u(300-u)}0.4=u(300−u)300
So:
u(300−u)=3000.4=750u(300-u)=\frac{300}{0.4}=750u(300−u)=0.4300=750
This gives a quadratic:
u2−300u+750=0u^2-300u+750=0u2−300u+750=0
Solve:
u=300±3002−4⋅1⋅7502=300±90000−30002=300±870002u=\frac{300\pm \sqrt{300^2-4\cdot 1\cdot 750}}{2} =\frac{300\pm \sqrt{90000-3000}}{2} =\frac{300\pm \sqrt{87000}}{2}u=2300±3002−4⋅1⋅750=2300±90000−3000=2300±87000
87000≈295\sqrt{87000}\approx 29587000≈295, so:
- u1≈300+2952=5952≈297.5 cmu_1\approx \frac{300+295}{2}=\frac{595}{2}\approx 297.5,\text{cm}u1≈2300+295=2595≈297.5cm
- u2≈300−2952=52=2.5 cmu_2\approx \frac{300-295}{2}=\frac{5}{2}=2.5,\text{cm}u2≈2300−295=25=2.5cm
Both are mathematically valid, but only one is physically reasonable for a projector:
- If u≈2.5 cmu\approx 2.5,\text{cm}u≈2.5cm, then v≈297.5 cmv\approx 297.5,\text{cm}v≈297.5cm.
- If u≈297.5 cmu\approx 297.5,\text{cm}u≈297.5cm, then v≈2.5 cmv\approx 2.5,\text{cm}v≈2.5cm.
In a normal slide projector, the slide is close to the focal length and the screen is far away, so we take u≈2.5 cmu\approx 2.5,\text{cm}u≈2.5cm and v≈297.5 cmv\approx 297.5,\text{cm}v≈297.5cm.
Convert back to meters:
- Distance from slide to lens: u≈2.475 mu\approx 2.475,\text{m}u≈2.475m
- Distance from lens to screen: v≈0.525 mv\approx 0.525,\text{m}v≈0.525m
Rounded clearly:
- Slide–lens distance ≈ 2.47 m
- Lens–screen distance ≈ 0.53 m
Step 2: Magnification of the slide
Magnification for a thin lens:
m=−vum=-\frac{v}{u}m=−uv
The minus sign indicates the image is inverted.
Use the distances:
m≈−297.52.5≈−119m\approx -\frac{297.5}{2.5}\approx -119m≈−2.5297.5≈−119
This value looks extremely large because we used centimeters with a very small focal length relative to a 3 m throw; in realistic projector problems, focal lengths are usually larger relative to the throw distance, giving more moderate magnifications.
However, the math for this specific data yields:
- ∣m∣≈119|m|\approx 119∣m∣≈119 (image 119 times taller than the slide).
If, instead, the intended units were that the focal length is 2.5 m (not cm), we would get a more reasonable magnification:
- Take f=2.5 mf=2.5,\text{m}f=2.5m, L=3 mL=3,\text{m}L=3m.
- Solving similarly gives u≈2.47 mu\approx 2.47,\text{m}u≈2.47m, v≈0.53 mv\approx 0.53,\text{m}v≈0.53m and:
m≈−0.532.47≈−0.21m\approx -\frac{0.53}{2.47}\approx -0.21m≈−2.470.53≈−0.21
which would mean the image is smaller than the slide, contradicting the typical projector situation.
Given the usual projector context, the likely intended interpretation is:
- Lens of focal length 2.5 cm ,
- Lens placed about 2.47 m from the slide,
- Magnification ≈ 119 , inverted.
If your textbook expects a more modest magnification (like 8–10×), then one of the given numbers (either focal length or the 3 m distance) is probably meant to be different, because standard lens formulas always tie distance and magnification together as above.
TL;DR:
- Distance from slide to lens: ≈ 2.47 m.
- Distance from lens to screen: ≈ 0.53 m.
- Magnification: image is inverted and about 119× larger than the slide (with the data exactly as stated).
Information gathered from public forums or data available on the internet and portrayed here.