NEET Test Series from KOTA - 10 Papers In MS WORD
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PHXII13:NUCLEI
363760
Assuming that about \(20\,MeV\) of energy is released per fusion reaction \({}_1{H^2} + {}_1{H^2} \to {}_0{n^1} + {}_2H{e^3}\) Then the mass of \({}_1{H^2}\) consumed per day in a fusion reactor of power 1 megawatt will approximately be
1 \(0.18\,g\)
2 \(0.001\,g\)
3 \(10.0\,g\)
4 \(1000\,g\)
Explanation:
\(P = {10^6}{\rm{Watt}}\) 1 day \( = {\rm{24}} \times {\rm{36}} \times {\rm{1}}{{\rm{0}}^2}\sec \) Energy produced \(U = 24 \times 36 \times {10^8}{\rm{joule}}\) Energy released per fusion reaction \( = 20\,MeV = {\rm{32}} \times {\rm{1}}{{\rm{0}}^{ - 13}}{\rm{joule}}\) Number of \({}_1{H^2}\) atoms used \( = \frac{{2 \times 24 \times 36 \times {{10}^8}}}{{32 \times {{10}^{ - 13}}}} = 54 \times {10^{21}}\) Mass of \(6 \times {10^{23}}\) atoms \( = 2g\) \(\therefore \) Mass of \(54 \times {10^{21}}\) atoms \( = \frac{2}{{6 \times {{10}^{23}}}} \times 54 \times {10^{21}} = 0.18g\)
PHXII13:NUCLEI
363761
If in a nuclear fusion process, the masses of the fusing nuclei be \(m_{1}\) and \(m_{2}\) and the mass of the resultant nucleus be \(m_{3}\), then
1 \(m_{3}=m_{1}+m_{2}\)
2 \(m_{3}=\left|m_{1}-m_{2}\right|\)
3 \(m_{3} < \left(m_{1}+m_{2}\right)\)
4 \(m_{3}>\left(m_{1}+m_{2}\right)\)
Explanation:
In a nuclear fusion, when two light nuclei of different masses are combined to form a stable nucleus, then some mass is lost and appears in the form of energy, called the mass defect. So, the mass of resultant nucleus is always less than the sum of masses of initial nuclei, \(i.e.{\text{ }}\,\,{m_3} < \left( {{m_1} + {m_2}} \right)\)
PHXII13:NUCLEI
363762
Fusion reaction is initiate with the help of
1 low temperature
2 high temperature
3 neutrons
4 any particle
Explanation:
Fusion reaction is initiated with the help of high temperature.
PHXII13:NUCLEI
363763
Nuclear fusion is common to the pair
1 thermonuclear reactor, uranium based nuclear reactor
2 energy production in the sun, uranium based nuclear reactor
3 energy production in the sun, hydrogen bomb
4 disintegration of heavy nuclei, hydrogen bomb
Explanation:
The energy released in the sun and hydrogen bomb are due to nuclear fusion.
363760
Assuming that about \(20\,MeV\) of energy is released per fusion reaction \({}_1{H^2} + {}_1{H^2} \to {}_0{n^1} + {}_2H{e^3}\) Then the mass of \({}_1{H^2}\) consumed per day in a fusion reactor of power 1 megawatt will approximately be
1 \(0.18\,g\)
2 \(0.001\,g\)
3 \(10.0\,g\)
4 \(1000\,g\)
Explanation:
\(P = {10^6}{\rm{Watt}}\) 1 day \( = {\rm{24}} \times {\rm{36}} \times {\rm{1}}{{\rm{0}}^2}\sec \) Energy produced \(U = 24 \times 36 \times {10^8}{\rm{joule}}\) Energy released per fusion reaction \( = 20\,MeV = {\rm{32}} \times {\rm{1}}{{\rm{0}}^{ - 13}}{\rm{joule}}\) Number of \({}_1{H^2}\) atoms used \( = \frac{{2 \times 24 \times 36 \times {{10}^8}}}{{32 \times {{10}^{ - 13}}}} = 54 \times {10^{21}}\) Mass of \(6 \times {10^{23}}\) atoms \( = 2g\) \(\therefore \) Mass of \(54 \times {10^{21}}\) atoms \( = \frac{2}{{6 \times {{10}^{23}}}} \times 54 \times {10^{21}} = 0.18g\)
PHXII13:NUCLEI
363761
If in a nuclear fusion process, the masses of the fusing nuclei be \(m_{1}\) and \(m_{2}\) and the mass of the resultant nucleus be \(m_{3}\), then
1 \(m_{3}=m_{1}+m_{2}\)
2 \(m_{3}=\left|m_{1}-m_{2}\right|\)
3 \(m_{3} < \left(m_{1}+m_{2}\right)\)
4 \(m_{3}>\left(m_{1}+m_{2}\right)\)
Explanation:
In a nuclear fusion, when two light nuclei of different masses are combined to form a stable nucleus, then some mass is lost and appears in the form of energy, called the mass defect. So, the mass of resultant nucleus is always less than the sum of masses of initial nuclei, \(i.e.{\text{ }}\,\,{m_3} < \left( {{m_1} + {m_2}} \right)\)
PHXII13:NUCLEI
363762
Fusion reaction is initiate with the help of
1 low temperature
2 high temperature
3 neutrons
4 any particle
Explanation:
Fusion reaction is initiated with the help of high temperature.
PHXII13:NUCLEI
363763
Nuclear fusion is common to the pair
1 thermonuclear reactor, uranium based nuclear reactor
2 energy production in the sun, uranium based nuclear reactor
3 energy production in the sun, hydrogen bomb
4 disintegration of heavy nuclei, hydrogen bomb
Explanation:
The energy released in the sun and hydrogen bomb are due to nuclear fusion.
363760
Assuming that about \(20\,MeV\) of energy is released per fusion reaction \({}_1{H^2} + {}_1{H^2} \to {}_0{n^1} + {}_2H{e^3}\) Then the mass of \({}_1{H^2}\) consumed per day in a fusion reactor of power 1 megawatt will approximately be
1 \(0.18\,g\)
2 \(0.001\,g\)
3 \(10.0\,g\)
4 \(1000\,g\)
Explanation:
\(P = {10^6}{\rm{Watt}}\) 1 day \( = {\rm{24}} \times {\rm{36}} \times {\rm{1}}{{\rm{0}}^2}\sec \) Energy produced \(U = 24 \times 36 \times {10^8}{\rm{joule}}\) Energy released per fusion reaction \( = 20\,MeV = {\rm{32}} \times {\rm{1}}{{\rm{0}}^{ - 13}}{\rm{joule}}\) Number of \({}_1{H^2}\) atoms used \( = \frac{{2 \times 24 \times 36 \times {{10}^8}}}{{32 \times {{10}^{ - 13}}}} = 54 \times {10^{21}}\) Mass of \(6 \times {10^{23}}\) atoms \( = 2g\) \(\therefore \) Mass of \(54 \times {10^{21}}\) atoms \( = \frac{2}{{6 \times {{10}^{23}}}} \times 54 \times {10^{21}} = 0.18g\)
PHXII13:NUCLEI
363761
If in a nuclear fusion process, the masses of the fusing nuclei be \(m_{1}\) and \(m_{2}\) and the mass of the resultant nucleus be \(m_{3}\), then
1 \(m_{3}=m_{1}+m_{2}\)
2 \(m_{3}=\left|m_{1}-m_{2}\right|\)
3 \(m_{3} < \left(m_{1}+m_{2}\right)\)
4 \(m_{3}>\left(m_{1}+m_{2}\right)\)
Explanation:
In a nuclear fusion, when two light nuclei of different masses are combined to form a stable nucleus, then some mass is lost and appears in the form of energy, called the mass defect. So, the mass of resultant nucleus is always less than the sum of masses of initial nuclei, \(i.e.{\text{ }}\,\,{m_3} < \left( {{m_1} + {m_2}} \right)\)
PHXII13:NUCLEI
363762
Fusion reaction is initiate with the help of
1 low temperature
2 high temperature
3 neutrons
4 any particle
Explanation:
Fusion reaction is initiated with the help of high temperature.
PHXII13:NUCLEI
363763
Nuclear fusion is common to the pair
1 thermonuclear reactor, uranium based nuclear reactor
2 energy production in the sun, uranium based nuclear reactor
3 energy production in the sun, hydrogen bomb
4 disintegration of heavy nuclei, hydrogen bomb
Explanation:
The energy released in the sun and hydrogen bomb are due to nuclear fusion.
NEET Test Series from KOTA - 10 Papers In MS WORD
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PHXII13:NUCLEI
363760
Assuming that about \(20\,MeV\) of energy is released per fusion reaction \({}_1{H^2} + {}_1{H^2} \to {}_0{n^1} + {}_2H{e^3}\) Then the mass of \({}_1{H^2}\) consumed per day in a fusion reactor of power 1 megawatt will approximately be
1 \(0.18\,g\)
2 \(0.001\,g\)
3 \(10.0\,g\)
4 \(1000\,g\)
Explanation:
\(P = {10^6}{\rm{Watt}}\) 1 day \( = {\rm{24}} \times {\rm{36}} \times {\rm{1}}{{\rm{0}}^2}\sec \) Energy produced \(U = 24 \times 36 \times {10^8}{\rm{joule}}\) Energy released per fusion reaction \( = 20\,MeV = {\rm{32}} \times {\rm{1}}{{\rm{0}}^{ - 13}}{\rm{joule}}\) Number of \({}_1{H^2}\) atoms used \( = \frac{{2 \times 24 \times 36 \times {{10}^8}}}{{32 \times {{10}^{ - 13}}}} = 54 \times {10^{21}}\) Mass of \(6 \times {10^{23}}\) atoms \( = 2g\) \(\therefore \) Mass of \(54 \times {10^{21}}\) atoms \( = \frac{2}{{6 \times {{10}^{23}}}} \times 54 \times {10^{21}} = 0.18g\)
PHXII13:NUCLEI
363761
If in a nuclear fusion process, the masses of the fusing nuclei be \(m_{1}\) and \(m_{2}\) and the mass of the resultant nucleus be \(m_{3}\), then
1 \(m_{3}=m_{1}+m_{2}\)
2 \(m_{3}=\left|m_{1}-m_{2}\right|\)
3 \(m_{3} < \left(m_{1}+m_{2}\right)\)
4 \(m_{3}>\left(m_{1}+m_{2}\right)\)
Explanation:
In a nuclear fusion, when two light nuclei of different masses are combined to form a stable nucleus, then some mass is lost and appears in the form of energy, called the mass defect. So, the mass of resultant nucleus is always less than the sum of masses of initial nuclei, \(i.e.{\text{ }}\,\,{m_3} < \left( {{m_1} + {m_2}} \right)\)
PHXII13:NUCLEI
363762
Fusion reaction is initiate with the help of
1 low temperature
2 high temperature
3 neutrons
4 any particle
Explanation:
Fusion reaction is initiated with the help of high temperature.
PHXII13:NUCLEI
363763
Nuclear fusion is common to the pair
1 thermonuclear reactor, uranium based nuclear reactor
2 energy production in the sun, uranium based nuclear reactor
3 energy production in the sun, hydrogen bomb
4 disintegration of heavy nuclei, hydrogen bomb
Explanation:
The energy released in the sun and hydrogen bomb are due to nuclear fusion.