The energy released during the nuclear change is 2.853*10^(-12) J.
A nuclear change -- involves changes in nuclear structure, such as fission (splitting) of a nucleus or an atom, or fusion (combining) of neutrons and protons to form heavier atoms
Given that,
Total mass
[tex]m=2.3465\times 10^{-27}\ kg[/tex]
After change , the mass of resulting materials
[tex]m'=2.3148\times 10^{-27}\ kg[/tex]
Using the Einstein's mass energy equation
[tex]E=mc^2[/tex]
The energy released during the change is given by
[tex]\Delta E=mc^2[/tex]
Where, [tex]\Delta m[/tex] is the change of mass in the process
c = speed of light
The change in mass
[tex]\Delta m=m-m'[/tex]
[tex]\Delta m=2.3465\times 10^{-27}-2.3148\times 10^{-27}[/tex]
[tex]\Delta m =0.0317\times 10^{-27}\ kg[/tex]
We substitute the value into the formula
[tex]\Delta E=0.0317\times 10^{-27}\times (3\times 10^8)^2[/tex]
[tex]\Delta E=2.853\ti,es 10^{-12}\ J[/tex]
Hence, The energy released during the change is 2.853*10^(-12) J.
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