Final answer:
To find the object distance for a lens with a focal length of 4.8 cm, use the lens equation with the image being 4 cm closer to the lens. Solve the resulting quadratic equation for x, which represents the object distance from the lens.
Step-by-step explanation:
To determine how far from the lens an object is placed based on the given lens equation 1/F = 1/x + 1/y, where F is the focal length, x is the object distance, and y is the image distance, we can plug in the known values and solve for x. The focal length provided is 4.8 cm. If the image is 4 cm closer to the lens than the object itself, we denote the object distance as x and the image distance as x - 4. Applying these values to the lens formula, we get:
1/4.8 = 1/x + 1/(x - 4)
To solve for x, we clear denominators:
- Multiply everything by the common denominator 4.8x(x - 4)
- 4.8x(x - 4)/4.8 = 4.8x(x - 4)/x + 4.8x(x - 4)/(x - 4)
- x(x - 4) = 4.8(x - 4) + 4.8x
- AFTER some algebraic simplifications:
- x^2 - 4x = 4.8x - 19.2 + 4.8x
- x^2 - 13.6x + 19.2 = 0
This quadratic equation can be solved for x using the quadratic formula or by factoring if possible. The positive root of this equation will give the object distance from the lens.
Please note the solution provided refers to the focal length as 8.00 cm in the reference information, which appears to be an inconsistency. I used the focal length of 4.8 cm as given in the actual question.