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प्रश्न
A wire of length 'L' and area of cross-section · A' is made of material of Young's modulus 'Y'. It is stretched by an amount 'x'. The work done in stretching the wire is ______.
विकल्प
`("Y""x"^2"A")/"2L"`
`(2"Y""x"^2"A")/"L"`
`("Y""x""A")/"2L"`
`("Y""x"^2"A")/2`
उत्तर
A wire of length 'L' and area of cross-section · A' is made of material of Young's modulus 'Y'. It is stretched by an amount 'x'. The work done in stretching the wire is `underline(("Y""x"^2"A")/"2L")`.
Explanation:
If a force Fis applied along the length L of wire for stretching by an amount x, then Young's modulus is given by
Y = `"stress"/"strain" = "FL"/"Ax"`
where, A = area of cross-sectional ⇒ F = `"YA"/"L"`x
The work done in stretching the wire is given by
W = `int_0^x "F" * "dx" = int_0^x "YA"/"L" x = "YA"/"L" [x^2/2]_0^x = ("YAx"^2)/"2L"`
